**Abstract**

This chapter discusses recent advances in biomedical applications of magnetohydrodynamics (MHD). The magnetohydrodynamic (MDH) effect is a physical phenomenon describing the motion of a conducting fluid flowing under influencing of an external magnetic field. The chapter covers four primary areas of research: (1) laser beam scanning, (2) nano-particle manipulation, (3) imaging contrast enhancement, and (4) targeted drug delivery. The state-of-the-art devices based on magnetohydrodynamic principles are also presented, providing a broad view of biomedical MHDs. As the field of biomedical MHDs continues to grow, advances towards micro-scale transitions will continue to be made, maintaining its clinically driven nature and motion towards real-world applications.

**Keywords:** magnetohydrodynamics, beam scanning, nanoparticles, imaging contrast, targeted drug delivery, magnetic constructs

### **1. Introduction**

Magnetohydrodynamic (MDH) effect is a physical phenomenon that describes the motion of charge conducting fluid flowing which his influenced by an external magnetic field. Its applications have been studied extensively across multiple disciplines ranging from the study of solar winds [1, 2] to MHD-driven biomedical sensors [3] and actuators [4–7]. This chapter narrows the focus of MHD applications to biomedical sciences. The chapter introduces four primary MHD biomedical applications: (1) magnetohydrodynamic-based laser beam scanning, (2) nanoparticle manipulations for biomedical applications, (3) biomedical imaging contrast enhancement, and (4) targeted drug delivery.

This chapter aims to present the current state of the art in the field with regards to biomedical and clinical applications of the MHD effect.

#### **2. Magnetohydrodynamic-based laser beam scanning**

#### **2.1 Introduction**

Adaptive optics (AO) enables correcting of complex aberrations for a broad range of applications [1, 2]. Conventional AO systems use spatial light modulators [3, 4] or solid deformable mirrors (DM) [5, 6] to compensate the phase changes

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resulting from non-uniformity in the properties of the medium through which light travels or from faults in the geometry of the component. There is two types of spatial light modulators operating in reflective and transmission modes. Due to using small liquid crystals, this type of wavefront shaping able to provide very high spatial resolution. However, there is a limitation in the correction magnitude which is usually in the range of a few micrometers. To resolve this issue, solid deformable mirrors have been developed and adopted widely to correct wavefront in optical systems. It consists of a solid reflecting surface connected to an actuator structure. By controlling the actuators, the shape of the reflective surface can be changed to compensate the wavefront distortions. The high cost of the actuators and intricate fabrication process are the main problems of the solid deformable mirrors. The current solid deformable mirrors can only provide small inter-actuator strokes, with the maximum deflection in the range of tens of micrometers.

AO systems have been used in laser beam shaping [7–9] and eye imaging systems [10–12] to effectively address both the low-intensity high-order aberrations and the high-intensity low-order aberrations. For example, high-resolution retinal imaging using AO plays a vital role in vision science and will help the early clinical diagnosis of eye diseases. For dealing with the ocular aberrations for a large population, e.g., myopic eyes, adaptive optics using two deformable mirrors have been designed [10–12]. The large-stroke DM with a limited number of actuators is used to correct large-intensity low-order aberrations. The second DM with a low stroke and a high spatial correction resolution is used to address the small-intensity highorder aberrations. However, its application in ophthalmology is limited by the complexity and the high cost. A new type of liquid deformable mirror [13–15] has been designed based on the actuation of the magnetic fluid. Although the liquid mirrors are constrained to the horizontal setup, the magnetic fluid deformable mirrors (MFDM) offer large strokes, low cost, and easy fabrication. Using the single inter-actuator, the strokes more than 100 μm can obtain with less power consumption. However, to produce a large mirror surface deformation, the size of the electromagnetic coils needs to be large. This makes the density of actuators low, and it is not suitable for high-order aberrations. A full-order correction with the high spatial resolution is achieved using a two-layer design layout with small electromagnetic coils has been designed. New wavefront corrector, MFDM, has major advantages such as large stroke, low cost, easy fabrication process, which can be easily customized for different applications. In the following sections, we will explain the technology and possible applications in *in-vivo* imaging and probing.

#### **2.2 Magnetic fluid deformable mirror (MFDM)**

The main elements of the MFDM are a layer of magnetic fluid, a thin film of a reflective material coated on the free surface of the fluid, a two-layer layout of the miniature electromagnetic coils placed beneath the fluid layer, and a Maxwell coil(s) (see **Figure 1**). The properties of the magnetic fluid used in the study are given in **Table 1**. Based on the definition, the magnetic fluid is a stable colloidal suspension of nano-sized, single-domain ferri/ferromagnetic particles. The fluid can be coated with a silver liquid-like thin film to improve the reflectance.

The upper layer coils are radially spaced at 2.1 mm from the center to center, and

3*=*7 p R from the middle coil with a radius of R = 100 mm [16] (see **Figure 1**). **Table 3** shows the parameters of the coil. The three coils are wired using American wire gauge (AWG) 25 magnet wire. The turn ratio of 64:49 is used for the top and bottom coils relative to the middle coil [16]. Also, magnetic fluids typically show low reflectance to light and can be coated with silver liquid-like thin films to improve the reflectance [17, 18]. The self-assembly method has been usually used to

To make the response of the actuators linear, the Maxwell coil was used to apply an external uniform magnetic field. The Maxwell coil consists of three individual

4*=*7 p R, at a distance

the lower layer coils are radially spaced at 4.2 mm, respectively.

**Magnetic fluid Parameters**

*Schematic design of the magnetic fluid deformable mirror (MFDM) (adapted from [20]).*

*Magnetohydrodynamics in Biomedical Applications DOI: http://dx.doi.org/10.5772/intechopen.87109*

**Magnetic fluid Parameters** Saturation magnetization 22 mT Relative permeability 2.89 Density 1190 kg/m<sup>3</sup> Viscosity 3 cp Thickness 1 mm

Position Upper Lower Core-type Air-cored Air-cored Material Copper Copper Wire gauge AWG37 AWG36 Internal diameter 1 mm 2 mm External diameter 2 mm 4 mm Length 1 mm 8 mm

coils, where both lateral/outer coils should have a radius of ffiffiffiffiffiffiffiffi

of ffiffiffiffiffiffiffi

**205**

**Table 2.**

**Figure 1.**

**Table 1.**

*Parameters of the magnetic fluid.*

*AWG, American wire gauge.*

*Parameters of the miniature electromagnetic coil.*

To achieve the correction of full-order aberrations with a high spatial resolution, the new design of MFDM is presented (see **Figure 1** for the details). The upper layer actuators of small size and high density are used to compensate for small-amplitude high-order aberrations, and the lower layer actuators with big size and low density are used to correct for large amplitude low order aberrations. The electromagnetic coils are circular coils wound on a cylindrical core. **Table 2** shows the physical parameters are of the coil. Each layer of the coil is arranged in a hexagonal array.

### *Magnetohydrodynamics in Biomedical Applications DOI: http://dx.doi.org/10.5772/intechopen.87109*

#### **Figure 1.**

*Schematic design of the magnetic fluid deformable mirror (MFDM) (adapted from [20]).*


#### **Table 1.**

*Parameters of the magnetic fluid.*


#### **Table 2.**

*Parameters of the miniature electromagnetic coil.*

The upper layer coils are radially spaced at 2.1 mm from the center to center, and the lower layer coils are radially spaced at 4.2 mm, respectively.

To make the response of the actuators linear, the Maxwell coil was used to apply an external uniform magnetic field. The Maxwell coil consists of three individual coils, where both lateral/outer coils should have a radius of ffiffiffiffiffiffiffiffi 4*=*7 p R, at a distance of ffiffiffiffiffiffiffi 3*=*7 p R from the middle coil with a radius of R = 100 mm [16] (see **Figure 1**). **Table 3** shows the parameters of the coil. The three coils are wired using American wire gauge (AWG) 25 magnet wire. The turn ratio of 64:49 is used for the top and bottom coils relative to the middle coil [16]. Also, magnetic fluids typically show low reflectance to light and can be coated with silver liquid-like thin films to improve the reflectance [17, 18]. The self-assembly method has been usually used to


Maxwell's equations govern the magnetic field. Since the magnetic field of the miniature coils is taken as point sources of magnetic potential located at the fluid boundary, electromagnetic field can be considered as a current-free one. Using this assumption, the displacement currents in the fluid are negligible, Maxwell's equa-

where *B* is the magnetic flux density, which is related to the magnetic field *H*

*μ* and *μ*<sup>0</sup> are the magnetic permeability of the magnetic fluid and free space, respectively. Assuming the applied field linearly magnetizes the magnetic fluid, the

where *χ* = *μ/μ*<sup>0</sup> *–* 1 is considered to be constant. Considering that the magnetic field extends into space above and below the fluid layer, Maxwell's equations are

Using Eqs. (2)–(4), the magnetic flux density *B*ð Þ*<sup>l</sup>* in these sub-domains can be

The magnetic flux intensity (B) meets the principle of superposition. Assume the fluid is irrotational, then based on the principles of conservation of mass and momentum and the theories on magnetic fields, the perturbation part of the surface

applied to all three sub-domains (1)–(3) as shown in **Figure 3**. The scalar potentials *ψ*(l), l = 1, 2, 3 describe the magnetic field vectors *H*(l) in these sub-

and the magnetization *M* by the following equation:

*Geometric representation of a circular MFDM (adapted from [20]).*

*Magnetohydrodynamics in Biomedical Applications DOI: http://dx.doi.org/10.5772/intechopen.87109*

magnetization vector *M* can be written as

written in terms of the scalar potentials *ψ*ð Þ*<sup>l</sup>* as:

dynamic governing equations can be written as [19].

þ *ρgς* þ *χB*<sup>0</sup>

∇2

∇2

*<sup>∂</sup><sup>z</sup>* � *<sup>σ</sup> <sup>∂</sup>*ð Þ<sup>2</sup> *<sup>ς</sup>*

*∂r*ð Þ<sup>2</sup> þ

1 *r ∂ς ∂r* þ 1 *r*ð Þ<sup>2</sup>

*∂ψ*ð Þ<sup>2</sup>

∇ � *H* ¼ 0*,* ∇ � *B* ¼ 0 (1)

*B* ¼ *μH* ¼ *μ*<sup>0</sup> ð Þ *H* þ *M* (2)

*<sup>H</sup>*ð Þ*<sup>l</sup>* ¼ �∇*ψ*ð Þ*<sup>l</sup> , l* <sup>¼</sup> <sup>1</sup>*;* <sup>2</sup>*;* <sup>3</sup> (4)

*<sup>B</sup>*ð Þ*<sup>l</sup>* ¼ �*μ*0ð Þ <sup>1</sup> <sup>þ</sup> *<sup>χ</sup>* <sup>∇</sup>*ψ*ð Þ*<sup>l</sup> , l* <sup>¼</sup> <sup>1</sup>*,* <sup>2</sup>*,* <sup>3</sup> (5)

*ψ* ¼ 0*,* � *d*≤ *z*≤ *ς* (6)

*<sup>ψ</sup>*ð Þ*<sup>l</sup>* <sup>¼</sup> <sup>0</sup>*, l* <sup>¼</sup> <sup>1</sup>*,* <sup>2</sup>*,* <sup>3</sup> (7)

¼ 0*, z* ¼ *ς* (8)

*∂*ð Þ<sup>2</sup> *ς ∂θ*ð Þ<sup>2</sup>

*M* ¼ *χH* (3)

tions can be written as:

**Figure 3.**

domains as follows:

�*ρ ∂ϕ ∂t*

**207**

#### **Table 3.**

*Parameters of the Maxwell coil(s).*

**Figure 2.** *Assembly of the prototype MFDM (adapted from [20]).*

prepare the silver liquid-like thin film for the MFDM. Firstly, the solution of silver nanoparticles was dissociated by centrifugation to remove the supernatant, and ethanol was then infused to purify the silver nanoparticles. The obtained silver nanoparticles were mixed with the ethanol/dodecanethiol solution, kept at room temperature for 24 h, and then centrifuged. Then the ethyl acetate was added into the silver nanoparticles obtained from the previous step. This solution was then applied to the surface of the magnetic fluid. When the ethyl acetate evaporated, the hydrophobic dodecanethiol encapsulated silver nano-particles automatically stacked and spread on the surface of the magnetic fluid to form a large scale area of silver liquid-like film.

**Figure 2** shows the fabricated mirror in which two-layer layout of the coils are installed within the Maxwell coil. Ferrofluid with layer thickness of about 1 mm is placed on top of the miniature coils, which is coated with the thin silver liquid-like film.

#### **2.3 Working principle of MFDM**

The MFDM is demonstrated by a cylindrical layer of a magnetic fluid as shown in **Figure 3**. The top free surface of the fluid layer is coated with a reflective film to be the deformable surface of the mirror. The surface deflection at the point (rk, θk) is indicated by ζ(rk, θk, t), where k = 1, 2, 3, …, k is a discrete number of surface points. The magnetic field produced by any specific coil, centered at the horizontal location (rij, θij), is idealized as that of a point source of magnetic potential ψij(t), where i = 1, 2 is the *i*th layer of actuators, and j, j = 1, 2, 3, …, Ji is the *j*th coil of each layer.

*Magnetohydrodynamics in Biomedical Applications DOI: http://dx.doi.org/10.5772/intechopen.87109*

**Figure 3.** *Geometric representation of a circular MFDM (adapted from [20]).*

Maxwell's equations govern the magnetic field. Since the magnetic field of the miniature coils is taken as point sources of magnetic potential located at the fluid boundary, electromagnetic field can be considered as a current-free one. Using this assumption, the displacement currents in the fluid are negligible, Maxwell's equations can be written as:

$$
\nabla \times H = \mathbf{0}, \nabla \cdot \mathbf{B} = \mathbf{0} \tag{1}
$$

where *B* is the magnetic flux density, which is related to the magnetic field *H* and the magnetization *M* by the following equation:

$$B = \mu H = \mu\_0 \left( H + \mathcal{M} \right) \tag{2}$$

*μ* and *μ*<sup>0</sup> are the magnetic permeability of the magnetic fluid and free space, respectively. Assuming the applied field linearly magnetizes the magnetic fluid, the magnetization vector *M* can be written as

$$\mathbf{M} = \mathbf{\hat{x}} \mathbf{H} \tag{3}$$

where *χ* = *μ/μ*<sup>0</sup> *–* 1 is considered to be constant. Considering that the magnetic field extends into space above and below the fluid layer, Maxwell's equations are applied to all three sub-domains (1)–(3) as shown in **Figure 3**. The scalar potentials *ψ*(l), l = 1, 2, 3 describe the magnetic field vectors *H*(l) in these subdomains as follows:

$$H^{(l)} = -\nabla \psi^{(l)}, l = \mathbf{1}, \mathbf{2}, \mathbf{3} \tag{4}$$

Using Eqs. (2)–(4), the magnetic flux density *B*ð Þ*<sup>l</sup>* in these sub-domains can be written in terms of the scalar potentials *ψ*ð Þ*<sup>l</sup>* as:

$$B^{(l)} = -\mu\_0(\mathbf{1} + \chi) \nabla \psi^{(l)}, l = \mathbf{1}, \mathbf{2}, \mathbf{3} \tag{5}$$

The magnetic flux intensity (B) meets the principle of superposition. Assume the fluid is irrotational, then based on the principles of conservation of mass and momentum and the theories on magnetic fields, the perturbation part of the surface dynamic governing equations can be written as [19].

$$
\nabla^2 \psi = 0,\\
$$

$$\nabla^2 \boldsymbol{\mu}^{(l)} = \mathbf{0}, l = \mathbf{1}, \mathbf{2}, \mathbf{3} \tag{7}$$

$$-\rho \frac{\partial \phi}{\partial t} + \rho \mathbf{g} \cdot \boldsymbol{\xi} + \chi \mathbf{B}\_0 \frac{\partial \boldsymbol{\nu}^{(2)}}{\partial \boldsymbol{z}} - \sigma \left(\frac{\partial^{(2)} \boldsymbol{\xi}}{\partial r^{(2)}} + \frac{1}{r} \frac{\partial \boldsymbol{\xi}}{\partial r} + \frac{1}{r^{(2)}} \frac{\partial^{(2)} \boldsymbol{\xi}}{\partial \theta^{(2)}}\right) = \mathbf{0}, \boldsymbol{z} = \boldsymbol{\xi} \tag{8}$$

where *ρ* is the density of the fluid, *σ* is the surface tension, φ, and ψ(l), *l* = 1, 2, 3 are the perturbation components of the fluid velocity potential and the magnetic potential, respectively. Using the following two boundary conditions:

$$-\frac{\partial \Phi}{\partial z} = \frac{\partial \mathfrak{z}}{\partial t}, z = \mathfrak{x} \tag{9}$$

where

*imn* <sup>¼</sup> *gtanh*ð Þ *<sup>λ</sup>mnd <sup>λ</sup>mn* <sup>þ</sup> *<sup>σ</sup>*

*<sup>d</sup>*<sup>2</sup> <sup>e</sup>*ζijmns*ð Þ*<sup>t</sup>*

where m and *n* = 1, 2, 3, …

more details refer to Ref. [20].

actuators.

attention.

**209**

¼ � *<sup>χ</sup> ρ B*0

*m* = 0, 1, 2, … and *n* = 1, 2, 3, …

*Magnetohydrodynamics in Biomedical Applications DOI: http://dx.doi.org/10.5772/intechopen.87109*

*dt*<sup>2</sup> <sup>þ</sup> <sup>4</sup> *<sup>η</sup>*

*ρ λ*2 *mn*

*tanh*ð Þ *λmnd Y*ð Þ �*λmnhi*

*ρ*

*tanh*ð Þ *<sup>λ</sup>mnd <sup>λ</sup>*<sup>3</sup>

of equations can be obtained concerning the mode shape *Hmns* as:

*λ*2 *mn*

(*rk*, *θk*), give the total surface displacement at the location as:

2

*i*¼1

þ<sup>X</sup> 2

*i*¼1

**3. Nanoparticle manipulations for biomedical applications**

drug delivery [24] (see more detail in Section 5).

*<sup>ζ</sup>*ð Þ¼ *rk; <sup>θ</sup>k; <sup>t</sup>* <sup>X</sup>

*d*e*ζijmns*ð Þ*t dt <sup>ω</sup>*<sup>2</sup>

of the second-order differential Eqs. (18) and (19) respectively, and the corresponding mode shapes Hmnc and Hmns evaluated at any desired location

> X *Ji*

X∞ *m*¼0

X *Ji*

*j*¼1

X∞ *n*¼1

X∞ *m*¼0

X∞ *n*¼1

Eqs. (18)–(19) show that the surface response *ζ(rk*, *θk*, *t*) has linear relation with the input *ψij*(*t*) applied by each coil. Note that the static surface response model of the mirror can be attained by the perturbed magnetic field of each actuator. For

This section introduced the current method to improve the correction performance of the MFDM for full-order aberrations, a new MFDM with a two-layer of

The application of magnetic nanoparticles (NPs) has been extensively studied in

Due to their size, NPs can interact with biological systems at the molecular level

Several studies describe different magnetic nanoparticles as well as different delivery techniques [25]. Magnetite NPs (e.g., Fe3O4) are the most widely used due to several appealing properties [26]. This type of NPs exhibit superparamagnetism which means that they do not have magnetic moment when there is no external field but become magnetized when an external magnetic field is applied.

biomedicine such as in imaging contrast enhancement [21] (see more detail in Section 4), magnetic separation [22], hyperthermia treatment [23], and targeted

and pass through biological barriers [24]. Using an external magnetic field to manipulate and to guide magnetic NPs to the wanted location has obtained special

*j*¼1

*mn* <sup>þ</sup> *<sup>χ</sup> ρ B*2

The main idea of the derivation of Eq. (18) is similar to the result of MFDM with a single-layer layout of actuators and more details can be found in [19]. A similar set

*imn*e*ζijmns*ð Þ*t*

*<sup>π</sup>R*<sup>2</sup> *Jm*þ<sup>1</sup> ½ � ð Þ *<sup>ε</sup>mn* <sup>2</sup> *<sup>ψ</sup>ij*ð Þ*<sup>t</sup> Hmns rij; <sup>θ</sup>ij* � �

e*ζijmnc*ð Þ*t Hmnc*ð Þ *rk; θ<sup>k</sup>*

e*ζijmns*ð Þ*t Hmns*ð Þ *rk; θ<sup>k</sup>*

*κ*

The generalized displacements <sup>e</sup>*ςijmnc*(*t*) and <sup>e</sup>*ςijmns*(*t*), obtained from the solution

<sup>0</sup>*tanh*ð Þ *<sup>λ</sup>mnd <sup>λ</sup>*<sup>2</sup>

*mn*

*Z*ð Þ �*λmnhi Y*ð Þ �*λmnhi*

(19)

(20)

(21)

*ω*2

$$-\frac{\partial \Phi}{\partial z} = 0, z = -d \tag{10}$$

The solutions concerning the input ψij(t) thus are obtained as follows:

$$
\zeta'(r\_k, \theta\_k, t) = \widetilde{\zeta}\_{ij}(t) J\_m(\lambda r\_k) \Theta(\theta\_k) \tag{11}
$$

$$\phi(r\_k, \theta\_k, z, t) = -\frac{1}{\lambda} \frac{\cosh[\lambda(z+d)]}{\sinh(\lambda d)} \frac{d\zeta\_{ij}}{dt} J\_m(\lambda r\_k) \Theta(\theta\_k) \tag{12}$$

$$\phi^{(2)}(r\_k, \theta\_k, z, t) = -\left[A\_{\vec{\eta}}(t) \left(\frac{\mu}{\mu\_0} \cosh \text{csch}(\lambda z) - \sinh \text{sinc}h(\lambda z)\right) + \frac{\chi}{\mu} B\_0 \widetilde{\zeta}\_{\vec{\eta}j}(t) \cosh(\lambda z)\right],\tag{13}$$

$$J\_m(\lambda r\_k) \Theta(\theta\_k)$$

where Jm(�) is the Bessel function of the first kind, *λ* is the separation constant, and

$$\Theta(\theta) = \{\sin m\theta, m = 1, 2, 3... \cos m\theta, m = 0, 1, 2, 3...\} \tag{14}$$

$$A\_{\vec{\eta}}(t) = \frac{1}{Y(-\lambda h\_i)} \times \left\{ Z(-\lambda h\_i) B\_0 \widetilde{\zeta}\_{\vec{\eta}}(t) + \frac{\kappa}{\pi \mathsf{R}^2 \left[ J\_{m+1}(\varepsilon) \right]^2} \mathcal{W}\_{\vec{\eta}}(t) \mathcal{R}(r\_{\vec{\eta}}) \Theta(\theta\_{\vec{\eta}}) \right\} \tag{15}$$

$$\begin{split} Y(-\lambda h\_i) &= -\frac{1}{\tanh(\lambda d) - \coth(\lambda d)} \\ &\times \left\{ \frac{\mu}{\mu\_0} (a + \chi) \cosh \cosh(-\lambda h\_i) - \left(\frac{\mu}{\mu\_0} (a - \chi) - \frac{\chi^2}{a}\right) \sinh(-\lambda h\_i) \right\} \end{split} \tag{16}$$

$$Z(-\lambda h\_i) = -\frac{1}{\tanh(\lambda d) - \coth(\lambda d)} \times \left\{ a \cosh(-\lambda h\_i) - \chi \sinh(-\lambda h\_i) \right\} \frac{\chi}{\mu}$$

$$\alpha = \frac{\mu}{\mu\_0} \tanh(\lambda d) - \coth(\lambda d), \kappa = \{1 \ m = 0 2 \ m \neq 0\} \tag{17}$$

Considering that the miniature coils are located far from the walls of the fluid container, so at *r* = *R* yields *Jm(λR)* = 0, which can be solved numerically and yields an infinite number of solutions *εmn* = *λR*, *m* = 0, 1, 2, …, *n* = 1, 2, 3, …, providing the eigenvalue *λmn* for each mode as *λmn* = *εmn*/*R*. Combining *Jm*(*λr*) and *Θ*(*θ*), we define the following mode shapes as *Hmnc* = *Jm*(*λmnr*)�cos(*mθ)* and *Hmns* = *Jm*(*λmnr*)�sin(*m*θ).

For any coil *ψij*(*t*) on each layer, based on Eq. (8) and the damping effect associated with the fluid viscosity *η*, the following surface dynamic equation with respect to the mode shape *Hmnc* can then be obtained as:

$$\begin{split} & \frac{d^2 \widetilde{\zeta}\_{ijmnc}(t)}{dt^2} + 4 \frac{\eta}{\rho} \lambda\_{mn}^2 \frac{d \widetilde{\zeta}\_{ijmnc}(t)}{dt} \alpha\_{imn}^2 \widetilde{\zeta}\_{ijmnc}(t) \\ &= -\frac{\chi}{\rho} B\_0 \frac{\tanh(\lambda\_{mn} d)}{Y(-\lambda\_{mn} h\_i)} \lambda\_{mn}^2 \frac{\kappa}{\pi \mathsf{R}^2 \left[J\_{m+1}(\varepsilon\_{mn})\right]^2} y\_{ij}(t) H\_{mnc}(r\_{ij}, \theta\_{ij}) \end{split} \tag{18}$$

*Magnetohydrodynamics in Biomedical Applications DOI: http://dx.doi.org/10.5772/intechopen.87109*

where

$$\alpha\_{imn}^2 = \text{gtanh}(\lambda\_{mn}d)\lambda\_{mn} + \frac{\sigma}{\rho} \tanh(\lambda\_{mn}d)\lambda\_{mn}^3 + \frac{\chi}{\rho}B\_0^2 \tanh(\lambda\_{mn}d)\lambda\_{mn}^2 \frac{Z(-\lambda\_{mn}h\_i)}{Y(-\lambda\_{mn}h\_i)} \tag{19}$$

*m* = 0, 1, 2, … and *n* = 1, 2, 3, …

The main idea of the derivation of Eq. (18) is similar to the result of MFDM with a single-layer layout of actuators and more details can be found in [19]. A similar set of equations can be obtained concerning the mode shape *Hmns* as:

$$\begin{split} & \frac{d^2 \widetilde{\zeta}\_{ijmn}(t)}{dt^2} + 4 \frac{\eta}{\rho} \lambda\_{mn}^2 \frac{d \widetilde{\zeta}\_{ijmn}(t)}{dt} \alpha\_{imn}^2 \widetilde{\zeta}\_{ijmn}(t) \\ &= -\frac{\chi}{\rho} B\_0 \frac{\tanh(\lambda\_{mn} d)}{Y(-\lambda\_{mn} h i)} \lambda\_{mn}^2 \frac{\kappa}{\pi R^2 [I\_{m+1}(\epsilon\_{mn})]^2} \nu\_{ij}(t) H\_{mm} \left(r\_{ij}, \theta\_{ij}\right) \end{split} \tag{20}$$

where m and *n* = 1, 2, 3, …

The generalized displacements <sup>e</sup>*ςijmnc*(*t*) and <sup>e</sup>*ςijmns*(*t*), obtained from the solution of the second-order differential Eqs. (18) and (19) respectively, and the corresponding mode shapes Hmnc and Hmns evaluated at any desired location (*rk*, *θk*), give the total surface displacement at the location as:

$$\begin{split} \zeta(r\_k, \theta\_k, t) &= \sum\_{i=1}^{2} \sum\_{j=1}^{J\_i} \sum\_{m=0}^{\infty} \sum\_{n=1}^{\infty} \widetilde{\zeta}\_{ijmnc}(t) H\_{mnc}(r\_k, \theta\_k) \\ &+ \sum\_{i=1}^{2} \sum\_{j=1}^{J\_i} \sum\_{m=0}^{\infty} \sum\_{n=1}^{\infty} \widetilde{\zeta}\_{ijmns}(t) H\_{mns}(r\_k, \theta\_k) \end{split} \tag{21}$$

Eqs. (18)–(19) show that the surface response *ζ(rk*, *θk*, *t*) has linear relation with the input *ψij*(*t*) applied by each coil. Note that the static surface response model of the mirror can be attained by the perturbed magnetic field of each actuator. For more details refer to Ref. [20].

This section introduced the current method to improve the correction performance of the MFDM for full-order aberrations, a new MFDM with a two-layer of actuators.

### **3. Nanoparticle manipulations for biomedical applications**

The application of magnetic nanoparticles (NPs) has been extensively studied in biomedicine such as in imaging contrast enhancement [21] (see more detail in Section 4), magnetic separation [22], hyperthermia treatment [23], and targeted drug delivery [24] (see more detail in Section 5).

Due to their size, NPs can interact with biological systems at the molecular level and pass through biological barriers [24]. Using an external magnetic field to manipulate and to guide magnetic NPs to the wanted location has obtained special attention.

Several studies describe different magnetic nanoparticles as well as different delivery techniques [25]. Magnetite NPs (e.g., Fe3O4) are the most widely used due to several appealing properties [26]. This type of NPs exhibit superparamagnetism which means that they do not have magnetic moment when there is no external field but become magnetized when an external magnetic field is applied.

This property is of great value for a variety of biomedical applications as magnetite NPs do not form into a mass together and can move easily through blood vessels [26]. The typical shape of these NPs is a sphere with the size of around 5–100 nm. Most importantly, Fe3O4 NPs are biocompatible which makes it suitable for many biomedical applications [27].

Currently, one of the leading research interests is associated with the delivery of magnetic NPs to a target location. Several approaches have been proposed to address the issue. For example, the surface of magnetic NPs has been modified with biomolecules to identify and attach to target cells. Also, injection of magnetic NPs to some localized regions has been suggested [28]. Furthermore, using an external force to control the NPs in the desired direction remotely has been proposed [29]. When an electric current passes through the micro-coils, it generates a non-uniform magnetic field which attracts the NPs at its minimal. The magnitude of the magnetic field *B* relates to the size of the wire as *B* ∝ *I/d*, gradients of the field as ∇*B* ∝ *I/d* [22], and curvatures as <sup>2</sup> *B* ∝ *I/d* [23], where *I* is the electric current through the wire [30]. The magnetic gradient makes it possible to trap magnetic NPs within a micrometer and sub-micrometer regions using small coils. The focusing depth of the micro-coils is in the range of tens of microns to several millimeters. The fluid containing magnetic NPs is usually placed on the top of the device allowing for magnetic manipulation of NPs. Such a method has been shown in several works for trapping and positioning of magnetic NPs by different types of microelectromagnets [29, 31]. This provides the possibility of controlling the strength of the field using external parameters such the current passing through micro-coils.

As an example, this method [32] is used for focusing and selective destruction of red blood cells (RBCs) via magnetic NPs. The experiment was accomplished above the micro-electromagnet serving concurrently as a source of the magnetic field and as a local heater. The motion and focusing of the blood cells near wires which carry the electric current were observed in the previous study. It was also found that the increase of the electric current through the micro-electromagnet leads to the local cell hemolysis. All the previous results have been obtained for the case when the guiding magnetic field was produced by just one conducting contour. In this work, experimental data was obtained for the modified micro-electromagnet with two contours, where the current in each path can be individually controlled. This modification gives an extra degree of freedom to tune the magnetic field profile and to manipulate magnetic nanoparticles.

solution are then mixed with 1 μl of commercially available ferrofluid from Ferrotec

*(A) Schematics of the micro-electromagnet and the external electric circuit. The device is fabricated on the top of a fused silica substrate. It consists of two Cu wires fabricated by optical lithography. The width of the wires is 10 μm, and the height of the wires is 2 μm. The wires are covered by the 300 nm of silicon dioxide. The top part of the structure is the working area where solution with biological cells and magnetic nanoparticles is placed. (B) Results of numerical modeling showing the surface profile of the scaled magnetic energy B<sup>2</sup> produced by the current-carrying wires. The red and the black curves show the scaled magnetic energy when 100 mA electric current is flowing through one of the contours. The blue curve shows the scaled magnetic energy when an electric*

The individual control of electric current (hence magnetic field) in the two contours allows for a variety of experiments to be conducted on biological cell manipulation. This application shows that the biological cell manipulation is possible due to the presence of magnetic nanoparticles. To support this statement, some studies performed control experiments with RBC samples without adding magnetic nanoparticles [34]. It is shown that applying a magnetic field without nanoparticles initiates a slight motion of RBCs away from the field source which is attributed to local heating and the expanding solution. However, when the study is conducted by adding 1.1% magnetic nanoparticles, applying the magnetic field results in the cells focusing near the field source. The focusing is attributed to the drag effect, where a flow of magnetic nanoparticles drags the cells in the same direction. The potential application of this is that with time-varying magnetic field one can move RBCs towards or away from the specific region. This technique can be further evolved for precise controlling of cellular motion and drug-carrying cells. There are many questions related to the mechanism of magnetic nanoparticles interaction with living cells which deserve separate studies and it is out of the scope of this chapter. Nanoparticle manipulation using magnetic field potentially may be useful in various areas including molecular biology, medicine, gene engineering, and drug delivery technology.

The electric current passing through the wire generates a non-uniform magnetic field around it. The gradient of this non-uniform magnetic field causes the magnetic NPs to be attracted towards the wires. Therefore, the movement of magnetic NPs pulls biological cells in the same direction [32]. **Figure 4(B)** shows the numerical results of the magnetic energy above the two straight wires. The red and black curves show the magnetic energy when the current is 100 mA in one of the wires. The blue curve shows the magnetic energy when the current passes through both wires. There is an overlap between the magnetic fields in the region and the wires (as depicted by the red dashed line in **Figure 4(B)**). This overlap is important for sequential trapping of magnetic NPs by applying a current through one or the other wires. The maximum of the field gradient is about 1.4 mT/μm in the vicinity of the

containing 1.1% magnetite (Fe3O4) particles in aqueous solution.

*current is flowing through both contours (adapted from [34]).*

*Magnetohydrodynamics in Biomedical Applications DOI: http://dx.doi.org/10.5772/intechopen.87109*

current-carrying wire.

**211**

**Figure 4.**

The schematics of the micro-magnetic prototype with biological substance and the external electric circuit are shown in **Figure 4(A)**. The device is fabricated on the top of a fused silica substrate. It consists of two Cu wires fabricated by standard optical lithography techniques. The width of the wires is 10 μm, and the height of the wires is 2 μm. The minimum spacing between the wires is 20 μm. Each of the two wires has individual contacts (1 mm 1 mm) on the sides of the structure for connection with the outer electric circuit. The circuit includes a power source and two electrical relay switches allowing for the individual control of electric current in each wire. The wires are covered by a 300 nm thick layer of silicon dioxide deposited via PECVD which allows for both electrical insulations as well as corrosion protection for the Cu wires. The top part of the structure is the working area where the manipulation of biological cells takes place. As a test biological substance, human red blood cells (RBC) are obtained from fresh blood samples. RBC was selected both due to their availability as well as their robustness [33]. Samples were prepared by triple washing using centrifugation at 2000 rpm on an Eppendorf 5424 centrifuge in phosphate buffered saline solution (PBS) at room temperature. PBS was prepared from 10 PBS (Fisher Scientific, USA) concentrate solution with a final concentration of 2000–4000 cells/μl. From this RBC solution, 30 μl of the

*Magnetohydrodynamics in Biomedical Applications DOI: http://dx.doi.org/10.5772/intechopen.87109*

#### **Figure 4.**

*(A) Schematics of the micro-electromagnet and the external electric circuit. The device is fabricated on the top of a fused silica substrate. It consists of two Cu wires fabricated by optical lithography. The width of the wires is 10 μm, and the height of the wires is 2 μm. The wires are covered by the 300 nm of silicon dioxide. The top part of the structure is the working area where solution with biological cells and magnetic nanoparticles is placed. (B) Results of numerical modeling showing the surface profile of the scaled magnetic energy B<sup>2</sup> produced by the current-carrying wires. The red and the black curves show the scaled magnetic energy when 100 mA electric current is flowing through one of the contours. The blue curve shows the scaled magnetic energy when an electric current is flowing through both contours (adapted from [34]).*

solution are then mixed with 1 μl of commercially available ferrofluid from Ferrotec containing 1.1% magnetite (Fe3O4) particles in aqueous solution.

The electric current passing through the wire generates a non-uniform magnetic field around it. The gradient of this non-uniform magnetic field causes the magnetic NPs to be attracted towards the wires. Therefore, the movement of magnetic NPs pulls biological cells in the same direction [32]. **Figure 4(B)** shows the numerical results of the magnetic energy above the two straight wires. The red and black curves show the magnetic energy when the current is 100 mA in one of the wires. The blue curve shows the magnetic energy when the current passes through both wires. There is an overlap between the magnetic fields in the region and the wires (as depicted by the red dashed line in **Figure 4(B)**). This overlap is important for sequential trapping of magnetic NPs by applying a current through one or the other wires. The maximum of the field gradient is about 1.4 mT/μm in the vicinity of the current-carrying wire.

The individual control of electric current (hence magnetic field) in the two contours allows for a variety of experiments to be conducted on biological cell manipulation. This application shows that the biological cell manipulation is possible due to the presence of magnetic nanoparticles. To support this statement, some studies performed control experiments with RBC samples without adding magnetic nanoparticles [34]. It is shown that applying a magnetic field without nanoparticles initiates a slight motion of RBCs away from the field source which is attributed to local heating and the expanding solution. However, when the study is conducted by adding 1.1% magnetic nanoparticles, applying the magnetic field results in the cells focusing near the field source. The focusing is attributed to the drag effect, where a flow of magnetic nanoparticles drags the cells in the same direction. The potential application of this is that with time-varying magnetic field one can move RBCs towards or away from the specific region. This technique can be further evolved for precise controlling of cellular motion and drug-carrying cells. There are many questions related to the mechanism of magnetic nanoparticles interaction with living cells which deserve separate studies and it is out of the scope of this chapter. Nanoparticle manipulation using magnetic field potentially may be useful in various areas including molecular biology, medicine, gene engineering, and drug delivery technology.

#### **4. Biomedical imaging contrast enhancement**

MHD plays an important role in biomedical imaging, ranging from magnetic resonance imaging (MRI) that employs the endogenous magnetization contrast of water in tissue to magnetofluids acting as contrast agents in a number of imaging modalities. These contrast agents enhance the ability to detect tumors, infection, inflammation, infarction or lesions in the body. This section highlights the role of magnetic fluids as contrast enhancing agents in MRI, X-ray computed tomography (CT) and optical coherence tomography (OCT) imaging.

rotation axis of the hydrogen nucleus and *ω* the Larmor angular frequency. When a resonant pulsed RF magnetic field is applied perpendicular to the SMF, the hydrogen nuclei process around the SMF axis in phase. After removal of RF pulse, the spins begin to diphase and so the detected transverse magnetic field *MT* signal starts

is called the spin-relaxation time. The nuclei return to their initial equilibrium state before the RF pulse by emitting an MR signal which also occurs by stimulation from surrounding nuclei. The process is assumed to occur in a simple exponential manner

time required for the nuclei system to return to 63% the equilibrium state, is called

*(A) When a 90° RF pulse is applied to the aligned magnetic dipoles, the net magnetization gets tipped to the transverse xy-plane. Dephasing of the spins results in a quick decrease of the net magnetization in the xy-plane MT. The dephasing occurs exponentially and characterized by T2. (B) After the pulsed magnetic field is removed, the longitudinal magnetic field MZ begins to grow exponentially to a maximum of MZ0; this growth is characterized by a parameter called T1, which the time it takes for the net magnetization along B0 to grow to*

Tissue/organ contrasts in MRI arises from differences in mainly these two basic physical parameters: the difference in the spin-relaxation time *T*<sup>1</sup> in the different organs required for the realignment to the SMF by the hydrogen nuclei of after the RF pulse is removed; the time constant *T*<sup>2</sup> with which the spins'signals arising from a given tissue will diphase after the pulsed RF signal is removed. **Figure 7** shows the variation in the longitudinal magnetization *MZ* characterized by *T*<sup>1</sup> and the decay in

*T*2

*T*1 *,* where *<sup>T</sup>*1, the

*,* where *<sup>T</sup>*<sup>2</sup>

to decrease. It does so according to the equation *MT*ðÞ¼ *<sup>t</sup> MT*ð Þ <sup>0</sup> exp �*<sup>t</sup>*

according to the equation *MZ*ðÞ�*<sup>t</sup> <sup>M</sup>*<sup>0</sup> <sup>¼</sup> ð Þ *MZ*<sup>0</sup> � *<sup>M</sup>*<sup>0</sup> <sup>1</sup> � exp �*<sup>t</sup>*

the spin-lattice relaxation time [42–44] (**Figure 6**).

*Magnetohydrodynamics in Biomedical Applications DOI: http://dx.doi.org/10.5772/intechopen.87109*

**Figure 6.**

**213**

*63% of the maximum value MZ0.*

#### **4.1 Contrast agents in MR imaging**

MRI is one of the major biomedical applications of MHD. MRI is a non-invasive tomographic medical imaging technique based on nuclear magnetic resonance (NMR) that provides high-resolution images of soft anatomical structures such as brain, heart, ligaments, and eyes [35–41]. This information is vital in delineating healthy from diseased tissues or organs. MRI takes advantage of the inherent magnetic dipole moments of the atomic nuclei in our bodies, specifically hydrogen nuclei contained in water—that makes about 70% of our body mass. Three magnetic fields comprising of a static magnetic field (SMF), a time-varying gradient magnetic fields (GMF) and a pulsed radiofrequency field (RF) are used to probe the magnetization/demagnetization map of the body. The water molecules that occupies most of the tissue in the body consist of hydrogen atoms with nuclei that possesses a quantum-mechanical spin. The hydrogen nucleus spin is associated to a magnetic dipole moment (**Figure 5(A)**) that gets aligned to a strong magnetic field *B*<sup>0</sup> with a bulk magnetization *Mz*<sup>0</sup> along *B*<sup>0</sup> when the body is placed in it as shown in **Figure 5(B)**. Since these hydrogen nuclei dipoles have an angular momentum from the rotation about their own axes, they precess around the *B*<sup>0</sup> magnetic field axis with an angular frequency that follows Larmor equation *ω* ¼ *γB*0*,* where *γ* is the gyromagnetic ratio constant of the hydrogen nucleus*.* The precession gives rise to a transverse magnetic field that can be detected by a coil conveniently placed in the system to pick up this signal. The equation of the signal detected is proportional to *S t*ðÞ¼ *γB*0*ρsin*ð Þ*θ* sin ð Þ *ωt ,* here *γ* is the gyromagnetic ratio constant of the hydrogen nucleus, *B*<sup>0</sup> the magnetic field intensity of the static magnetic field, *ρ* the density of hydrogen nuclei of the tissue, *θ* the flip angle between the axis of the SMF and the

#### **Figure 5.**

*(A) The hydrogen nucleus possesses a quantum-mechanical spin (angular momentum) that is associated with a magnetic dipole moment. (B) When the body is placed in a strong magnetic field B0, the hydrogen nuclei dipoles get aligned with the field B0 with a net magnetization vector MZ0. The dipoles precess around the axis of the magnetic field with an angular frequency that follows Larmor equation ω* ¼ *γB*0*, where γ is the intrinsic gyromagnetic ratio constant of the hydrogen nucleus.*

rotation axis of the hydrogen nucleus and *ω* the Larmor angular frequency. When a resonant pulsed RF magnetic field is applied perpendicular to the SMF, the hydrogen nuclei process around the SMF axis in phase. After removal of RF pulse, the spins begin to diphase and so the detected transverse magnetic field *MT* signal starts to decrease. It does so according to the equation *MT*ðÞ¼ *<sup>t</sup> MT*ð Þ <sup>0</sup> exp �*<sup>t</sup> T*2 *,* where *<sup>T</sup>*<sup>2</sup> is called the spin-relaxation time. The nuclei return to their initial equilibrium state before the RF pulse by emitting an MR signal which also occurs by stimulation from surrounding nuclei. The process is assumed to occur in a simple exponential manner according to the equation *MZ*ðÞ�*<sup>t</sup> <sup>M</sup>*<sup>0</sup> <sup>¼</sup> ð Þ *MZ*<sup>0</sup> � *<sup>M</sup>*<sup>0</sup> <sup>1</sup> � exp �*<sup>t</sup> T*1 *,* where *<sup>T</sup>*1, the time required for the nuclei system to return to 63% the equilibrium state, is called the spin-lattice relaxation time [42–44] (**Figure 6**).

Tissue/organ contrasts in MRI arises from differences in mainly these two basic physical parameters: the difference in the spin-relaxation time *T*<sup>1</sup> in the different organs required for the realignment to the SMF by the hydrogen nuclei of after the RF pulse is removed; the time constant *T*<sup>2</sup> with which the spins'signals arising from a given tissue will diphase after the pulsed RF signal is removed. **Figure 7** shows the variation in the longitudinal magnetization *MZ* characterized by *T*<sup>1</sup> and the decay in

#### **Figure 6.**

*(A) When a 90° RF pulse is applied to the aligned magnetic dipoles, the net magnetization gets tipped to the transverse xy-plane. Dephasing of the spins results in a quick decrease of the net magnetization in the xy-plane MT. The dephasing occurs exponentially and characterized by T2. (B) After the pulsed magnetic field is removed, the longitudinal magnetic field MZ begins to grow exponentially to a maximum of MZ0; this growth is characterized by a parameter called T1, which the time it takes for the net magnetization along B0 to grow to 63% of the maximum value MZ0.*

#### **Figure 7.**

*(A) The T1 relaxation time, known as the spin-lattice relaxation time, is the measure of how fast the net magnetization vector (NMV) occurs along the SMF. Different tissue in the body possesses different T1 relaxation times (a) which act as a contrast for the different tissue and even of diseased tissues such as tumors. (B) T2 relaxation refers to the progressive dephasing of spinning dipoles following the 90° pulse as seen in a spin-echo sequence due to tissue-particular characteristics (b).*

the transverse magnetization *MT*, characterized by *T*<sup>2</sup> in the different tissues in the body [45].

**4.2 Contrast agents in X-ray and CT**

*Commonly used MRI contrast agents for medical diagnosis.*

Gadomelitol Vistarem®

*Magnetohydrodynamics in Biomedical Applications DOI: http://dx.doi.org/10.5772/intechopen.87109*

*T2-weighted contrast agents* Ferumoxide (AMI-25) (Fe3O4γFe2O3)

Ferumoxsil (AMI-121) (Fe3O4γFe2O3)

**Table 4.**

**215**

absorption coefficient *μ* can be expressed as:

higher density tissues, absorb X-ray better [66].

Computed tomography (CT) is a powerful non-invasive diagnostic imaging technique [64]. CT can be employed for imaging hard organs or tissues (e.g., bones) or soft ones such as the gastrointestinal (GI) tract, the cardiovascular system, renal tract, liver, lungs, cartilage, and tumorous tissue with the aid of contrast agents. A CT image is obtained by rotating an X-ray source(s) (or detector/detector array) around an object or vise verse, with a detector(s) positioned directly opposite the radiation source(s). Generally, X-ray scans are taken at small angular increments during rotation around the object over 360° or 180° [65]. An X-ray attenuation (or phase or scattering) map or projections are thus obtained. The projections are then

**Compounds Trade name Target organs and tissue Reference**

Gadoteric acid (Gd-DOTA) ClariscanTM Brain and spine [58]

Ferumoxtran (Fe3O4<sup>γ</sup>Fe2O3) Sinerem® Lymph nodes, blood [62] Ferrixan (Fe3O4) Resovist® Liver [63]

Angiography [57]

[61]

Feridex® Liver, spleen, Bone marrow [59, 60]

Lumirem® Liver, spleen, gastrointestinal tract

(Gadomelitol)

processed mathematically to create a 3D rendering of the scanned object.

Another diagnostic imaging method related to CT is X-ray fluoroscopy—form of a projection imaging with contrast agent. Fluoroscopy allows for the acquisition of real-time, continuous images of the internal organs. Like in MRI, imaging contrast agents are often used in X-ray imaging for better contrast resolution. Usually, small iodinated agents are injected into blood vessels for use in fluoroscopic angiography, allowing for the evaluation of blood flow and visualization of the vasculature system, while barium contrast media are introduced orally or with an enema to investigate the anatomy (and pathology) of the gastrointestinal tract. The X-ray

*<sup>μ</sup>*<sup>≈</sup> *<sup>ρ</sup>Z*<sup>4</sup>

where *ρ* is the density of the material, *Z* the atomic number, *A* the atomic mass and *E* the X-ray energy. Therefore, materials of higher density and atomic number,

While lanthanide-based contrast agents are a common stay in MRI, their application in CT as contrast agents is being explored based on their high atomic numbers [64]. The two major reasons motivating the investigation of gadolinium-based compounds as CT contrast agents include use in patients who are contraindicated for iodinated agents based on allergic reactions or renal insufficiency and the fact that *Gd* has higher K edges than iodine providing better contrast enhancement at higher X-ray photon energies, potentially reducing radiation exposure to patients [67]. A summary of some of the gadolinium compounds used in MRI as contrast agents are listed in **Table 4**. Clinically approved gadolinium-based contrast agents

*AE*<sup>3</sup> (22)

Magnetic fluids play an important role as contrast enhancing agents in MRI. These contrast agents serve to shorten the relaxation time of the water molecules surrounding the tissue or organs with the contrast agent molecules, which then increases the signal intensity detected and thereby providing a positive contrast. The contrast agents used in MRI can broadly be divided into two major categories: the *T*1-weighted contrast agents and *T*2-weighted contrast agents. *T*1-weighted contrast agents shorten the *T*<sup>1</sup> relaxation time to improve the *T*<sup>1</sup> relaxation contrast, brightening the *T*1-weighted image. *T*<sup>1</sup> contrast agents usually consist of gadolinium (Gd) compounds. On the other hand,*T*<sup>2</sup> contrast agents serve to brighten the *T*2-weighted images by shortening the *T*<sup>2</sup> relaxation time. *T*<sup>2</sup> contrast agents consist mainly of superparamagnetic iron oxide and iron platinum. **Table 4** summarizes the major commercially available magnetic fluids used as contrast agents in MRI imaging today.


*Magnetohydrodynamics in Biomedical Applications DOI: http://dx.doi.org/10.5772/intechopen.87109*


#### **Table 4.**

*Commonly used MRI contrast agents for medical diagnosis.*

#### **4.2 Contrast agents in X-ray and CT**

Computed tomography (CT) is a powerful non-invasive diagnostic imaging technique [64]. CT can be employed for imaging hard organs or tissues (e.g., bones) or soft ones such as the gastrointestinal (GI) tract, the cardiovascular system, renal tract, liver, lungs, cartilage, and tumorous tissue with the aid of contrast agents. A CT image is obtained by rotating an X-ray source(s) (or detector/detector array) around an object or vise verse, with a detector(s) positioned directly opposite the radiation source(s). Generally, X-ray scans are taken at small angular increments during rotation around the object over 360° or 180° [65]. An X-ray attenuation (or phase or scattering) map or projections are thus obtained. The projections are then processed mathematically to create a 3D rendering of the scanned object.

Another diagnostic imaging method related to CT is X-ray fluoroscopy—form of a projection imaging with contrast agent. Fluoroscopy allows for the acquisition of real-time, continuous images of the internal organs. Like in MRI, imaging contrast agents are often used in X-ray imaging for better contrast resolution. Usually, small iodinated agents are injected into blood vessels for use in fluoroscopic angiography, allowing for the evaluation of blood flow and visualization of the vasculature system, while barium contrast media are introduced orally or with an enema to investigate the anatomy (and pathology) of the gastrointestinal tract. The X-ray absorption coefficient *μ* can be expressed as:

$$
\mu \approx \frac{\rho Z^4}{AE^3} \tag{22}
$$

where *ρ* is the density of the material, *Z* the atomic number, *A* the atomic mass and *E* the X-ray energy. Therefore, materials of higher density and atomic number, higher density tissues, absorb X-ray better [66].

While lanthanide-based contrast agents are a common stay in MRI, their application in CT as contrast agents is being explored based on their high atomic numbers [64]. The two major reasons motivating the investigation of gadolinium-based compounds as CT contrast agents include use in patients who are contraindicated for iodinated agents based on allergic reactions or renal insufficiency and the fact that *Gd* has higher K edges than iodine providing better contrast enhancement at higher X-ray photon energies, potentially reducing radiation exposure to patients [67]. A summary of some of the gadolinium compounds used in MRI as contrast agents are listed in **Table 4**. Clinically approved gadolinium-based contrast agents


**Table 5.**

*Lanthanide-based contrast agents for CT and X-ray.*

have been tested in CT for imaging the cardiovascular system and for pulmonary and aortic angiography. **Table 5** summarizes some of the *Gd* compounds that have been tested as contrast agents in CT.

#### **4.3 Magnetic contrast agents in OCT imaging**

OCT is non-invasive cross-sectional imaging modality that uses light to interrogate tissue providing a 3D rendering of the tissue under investigation [74]. **Figure 8** depicts the principle of OCT. A low-coherence light from a laser source is split into two halves, with one half guided to a mirror (reference arm) and the other half used to illuminate the tissue under investigation (sample arm). The reflections from the reference arm and from the tissue are recombined by beam combiner and detected. The electrical signal from the photodetector is bandpass digitized and demodulated before being stored on a computer. The low-coherence in the light being used allows for interference between the two arms to occur only when the two optical path lengths are equal. Therefore, fine scanning of the reference arm mirror allows for interference to occur with light originating from the different depths of the tissue. Transverse scanning of the optical beam then allows for a 3D imaging of the tissue [75].

The ability of a tissue to be magnetized is quantified as magnetic susceptibility *χ* and can be used as means of contrast in OCT imaging. Biological tissue is comparatively non-magnetic j j *<sup>χ</sup>* � <sup>10</sup>�<sup>5</sup> when compared to ferromagnetic iron oxides, whose *χ* is 10<sup>5</sup> times greater than that of tissue. This means that the *χ* difference between tissue and magnetic particles can be exploited to provide contrast in OCT imaging of tissue doped with magnetic nanoparticles whose localized exogenously induced motion can be resolved by OCT and used as a contrast feature [76]. The motion of the nanoparticles in the tissue is caused by a magnetic gradient force:

*Magnetomotive OCT tissue configuration. (A) A sample is doped with magnetic microparticles, placed in a magnetic field and shone with an optical imaging beam. The contrast mechanisms illustrated by two states of a magnetic microparticle (filled and dash-outlined shapes, respectively) within the imaging focal volume and the*

*V χ* � *χmed* ð Þ∇ *B*

where *F* is the force acting on the magnetic nanoparticles with susceptibility of *χ* within its surrounding tissue medium with susceptibility of *χmed*, *B* being the magnetic flux density, *V* is the volume of the tissue nanoparticles and magnetic

As shown in **Figure 9**, when the magnetic nanoparticles get laterally displaced by the magnetic force, the OCT the increase in the light scattered back also gets shifted laterally. **Figure 9(B–D)** shows the variation in the OCT signal variation that follow changes in the nanoparticles position arising from the magnetic force.

As it was initially assumed by Widder et al. in 1978 [78], magnetic constructs can target specific locations, such as tumor sites, holding enormous potential for sitespecific drug delivery, see **Figure 10**. This subchapter discusses a clinically driven application of MHD focusing on magnetic drug targeting. MHD drug targeting refers to the magnetically targeted and/or triggered therapeutic agent delivery

2*μ*<sup>0</sup>

! 2

(23)

*F* ! ¼

permeability in vacuum [77].

**5. Targeted drug delivery**

**5.1 Introduction**

**217**

**Figure 9.**

*associated (A–D).*

*Magnetohydrodynamics in Biomedical Applications DOI: http://dx.doi.org/10.5772/intechopen.87109*

#### **Figure 8.**

*Schematic illustrating the concept of low coherence interferometry. Using a short coherence length light source and a Michelson-type interferometer, interference fringes are observed only when the path lengths of the two interferometer arms are matched to within the coherence length (lc) of the light source (adapted from [41]).*

#### **Figure 9.**

*Magnetomotive OCT tissue configuration. (A) A sample is doped with magnetic microparticles, placed in a magnetic field and shone with an optical imaging beam. The contrast mechanisms illustrated by two states of a magnetic microparticle (filled and dash-outlined shapes, respectively) within the imaging focal volume and the associated (A–D).*

The ability of a tissue to be magnetized is quantified as magnetic susceptibility *χ* and can be used as means of contrast in OCT imaging. Biological tissue is comparatively non-magnetic j j *<sup>χ</sup>* � <sup>10</sup>�<sup>5</sup> when compared to ferromagnetic iron oxides, whose *χ* is 10<sup>5</sup> times greater than that of tissue. This means that the *χ* difference between tissue and magnetic particles can be exploited to provide contrast in OCT imaging of tissue doped with magnetic nanoparticles whose localized exogenously induced motion can be resolved by OCT and used as a contrast feature [76]. The motion of the nanoparticles in the tissue is caused by a magnetic gradient force:

$$\overrightarrow{F} = \frac{V(\chi - \chi\_{med})\nabla\left|\overrightarrow{B}\right|^2}{2\mu\_0} \tag{23}$$

where *F* is the force acting on the magnetic nanoparticles with susceptibility of *χ* within its surrounding tissue medium with susceptibility of *χmed*, *B* being the magnetic flux density, *V* is the volume of the tissue nanoparticles and magnetic permeability in vacuum [77].

As shown in **Figure 9**, when the magnetic nanoparticles get laterally displaced by the magnetic force, the OCT the increase in the light scattered back also gets shifted laterally. **Figure 9(B–D)** shows the variation in the OCT signal variation that follow changes in the nanoparticles position arising from the magnetic force.

#### **5. Targeted drug delivery**

#### **5.1 Introduction**

As it was initially assumed by Widder et al. in 1978 [78], magnetic constructs can target specific locations, such as tumor sites, holding enormous potential for sitespecific drug delivery, see **Figure 10**. This subchapter discusses a clinically driven application of MHD focusing on magnetic drug targeting. MHD drug targeting refers to the magnetically targeted and/or triggered therapeutic agent delivery

metal derivatives, e.g., μ-oxo N,N<sup>0</sup>

*Magnetohydrodynamics in Biomedical Applications DOI: http://dx.doi.org/10.5772/intechopen.87109*

**Figure 11.** *Targeted drug release.*

magnetic induction *B*:

diluted suspension.

of a base solution *χw*.

**219**

assumed to be point-like particles:

*Fm* <sup>¼</sup> ð Þ *<sup>m</sup>* � <sup>∇</sup> *<sup>B</sup>* <sup>¼</sup> *Vm* <sup>Δ</sup>*<sup>χ</sup>*

magnetic moment *m* on a magnetic construct*:*

*μ*0

3D-printing [100], nanoparticle clusters [96, 101].


*B* ¼ *μ*0ð Þ¼ *H* þ *M μ*0*H* (24)

*m* ¼ *VmM* ¼ *VmΔχH* ¼ *Vm*ð Þ *χ<sup>m</sup>* � *χ<sup>w</sup> H* (25)

*B*2 2*μ*<sup>0</sup> 

¼ *Vm*Δ*χ*∇

1 2 *B* � *H* (26)

[92–94], are used. Magnetic constructs can be porous or hollow single magnetic nano/microparticles encapsulating the drug in pores and cavities [95], nonmagnetic polymeric or inorganic nano/microparticles encapsulating both magnetic material and drug [96], magnetosomes [97], micelles [98] or liposomes, micro/ nanoswimmers or micro/nanomotors prepared by layer-by-layer deposition [99] or

The basic principle of magnetically targeted drug delivery is based on the physical phenomenon of the translational motion of a magnetic construct when a magnetic field gradient is applied. Magnetic construct with a therapeutic agent encapsulated into the construct and/or conjugated on its surface is injected systemically (or delivered locally via catheter) and transported by the blood circulation to the target location. While intravenous injection is associated with higher clearance from the bloodstream, it is being used more frequently when compared to the intra-arterial routes. A strong, high-gradient magnetic field is then applied to allow translating magnetic constructs to the target location and capturing them. Literature suggests that flux density at the target location must be of the order of a few hundred millitesla with a few teslas per meter field gradient for slow blood flow arteries and up to a few hundred for fast blood flow arteries. Magnetic constructs are driven by the magnetic force *Fm* dependent on the

where *μ*<sup>0</sup> is a permeability of free space, *H* is a magnetic field strength and *M* is a total magnetization of the magnetic construct which could be neglected in case of

where *Vm* is a volume magnetic construct, *Δχ* is an effective susceptibility given via a difference between susceptibility of a magnetic construct *χ<sup>m</sup>* and susceptibility

Under the assumption that magnetic constructs are very small and could be

ð Þ *B* � ∇ *B* ¼ *V*mΔ*χ*∇

In the case of supermagnetic constructs in a diamagnetic base solution, the

#### **Figure 10.**

*Magnetic constructs (A) or constructs with evenly distributed magnetic material (B) applied parenterally (intravenously or intra-arterially), can be used as intravascular vehicles for targeted drug delivery if drug-loaded (C) or -coated (D).*

method that augments the concentration of the agent in the target area. In the first part, drug-loaded magnetic constructs are discussed as individual intra-vascular vehicles for site-specific drug delivery. In the second part, magnetohydrodynamic (micro) pumps for controlling magnetic nanoparticles dispersed in a base fluid are discussed. These are reviewed and summarized separately based on the knowledge already available in literature.

#### **5.2 Magnetic constructs**

Due to their superior properties such as biocompatibility, biodegradability, large loading capacity, and controlled release ability, magnetic constructs have attracted a lot of attention. They offer mean to remotely direct therapeutic agents to welllocalized sites of interest, improving control on dosing, reducing the concentration requirements up to 20% [79], associated toxicity, and fluctuation in circulating drug levels [80–82]. While drug release usually occurs by passive diffusion, triggering via enzymatic activity, physiological conditions [83] or magnetically [84–86], see **Figure 11**, can be performed. On-site controlled drug release is another important factor for effective therapeutics. For example, when the magnetic construct is exposed to an alternating magnetic field, drug release can occur. Via facilitated drug release, collateral tissue damage and toxic side effects may be further decreased or fully eliminated [87, 88]. This is important for applications balancing between efficacy and toxicity, e.g., chemotherapies [89].

The use of magnetic constructs as therapeutic agents has increased exponentially since the earliest studies by Senyei et al. [90] and magnetic carriers of increased sophistication have been developed [91]. While nanoparticles are the simplest magnetic constructs, currently, there are many different types of carriers for magnetic targeting. Generally, any biocompatible magnetic materials, magnetic materials coated by a biocompatible polymer or inorganic material, or magnetic materials precipitated inside the pores of a biocompatible polymer or inorganic material can be used. While the use of iron oxide particles in the form of magnetite (Fe3O4) or maghemite (γ-Fe2O3) predominates, any metal, e.g., cobalt or nickel, or

*Magnetohydrodynamics in Biomedical Applications DOI: http://dx.doi.org/10.5772/intechopen.87109*

**Figure 11.** *Targeted drug release.*

metal derivatives, e.g., μ-oxo N,N<sup>0</sup> -bis(salicylidene)ethylenediamine iron-Fe(salen) [92–94], are used. Magnetic constructs can be porous or hollow single magnetic nano/microparticles encapsulating the drug in pores and cavities [95], nonmagnetic polymeric or inorganic nano/microparticles encapsulating both magnetic material and drug [96], magnetosomes [97], micelles [98] or liposomes, micro/ nanoswimmers or micro/nanomotors prepared by layer-by-layer deposition [99] or 3D-printing [100], nanoparticle clusters [96, 101].

The basic principle of magnetically targeted drug delivery is based on the physical phenomenon of the translational motion of a magnetic construct when a magnetic field gradient is applied. Magnetic construct with a therapeutic agent encapsulated into the construct and/or conjugated on its surface is injected systemically (or delivered locally via catheter) and transported by the blood circulation to the target location. While intravenous injection is associated with higher clearance from the bloodstream, it is being used more frequently when compared to the intra-arterial routes. A strong, high-gradient magnetic field is then applied to allow translating magnetic constructs to the target location and capturing them. Literature suggests that flux density at the target location must be of the order of a few hundred millitesla with a few teslas per meter field gradient for slow blood flow arteries and up to a few hundred for fast blood flow arteries.

Magnetic constructs are driven by the magnetic force *Fm* dependent on the magnetic induction *B*:

$$B = \mu\_0 (H + M) = \mu\_0 H \tag{24}$$

where *μ*<sup>0</sup> is a permeability of free space, *H* is a magnetic field strength and *M* is a total magnetization of the magnetic construct which could be neglected in case of diluted suspension.

In the case of supermagnetic constructs in a diamagnetic base solution, the magnetic moment *m* on a magnetic construct*:*

$$m = V\_m \\ M = V\_m \\ \Delta \chi \\ H = V\_m (\chi\_m - \chi\_w) \\ H \tag{25}$$

where *Vm* is a volume magnetic construct, *Δχ* is an effective susceptibility given via a difference between susceptibility of a magnetic construct *χ<sup>m</sup>* and susceptibility of a base solution *χw*.

Under the assumption that magnetic constructs are very small and could be assumed to be point-like particles:

$$F\_m = (m \cdot \nabla)B = \frac{V\_m \,\Delta \chi}{\mu\_0} (B \cdot \nabla)B = V\_m \Delta \chi \nabla \left(\frac{B^2}{2\mu\_0}\right) = V\_m \Delta \chi \nabla \left(\frac{1}{2} \, B \cdot H\right) \tag{26}$$

On the one side, the magnetic force *Fm* dependents on the magnetic constructs size (amount of magnetic material). While magnetic constructs are flexible in their dimensions from a few nanometers up to a few micrometers, there is a trade-off between larger magnetic force and the appropriate physiological response [82, 102, 103]. On the other side, the magnetic force is proportional to the magnetic gradient. The magnetization of the magnetic constructs, however, increases with the external magnetic field only while the magnetic field is below the saturation field.

In order to increase magnetic force up to several orders of magnitude further, magnetizable implant (biocompatible wire, needle, stent, filament or seed) creating a high-gradient magnetic field at the target location under the influence of an external magnetic field could be used, see **Figure 12** [104]. While implant can solve problem of magnetic force strength and distance decay, as well as being successfully used at MRI facilities in applications related to cardiovascular, digestive and urinary systems under clinically feasible conditions, it makes the procedure of magnetic drug targeting minimally invasive. The concept has been successfully demonstrated *in vivo* [105] and is promising for magnetically targeted thrombolytic therapy.

possess a simpler fabrication process when compared to mechanical (micro)pumps [120]. MHD (micro)pumps have attracted the attention of many researchers as they could achieve high flow rates and produce bi-directional flow. To use MHD (micro) pumps for drug delivery, however, the stability of the flow rate is critical. The flow rate of MHD (micro)pumps depends on the current and the magnetic flux density [112]. Nevertheless the flux density from a permanent magnet is higher than that of an electromagnet, some authors hypothesized that electromagnets are more useful as their polarity could be reversed, leading to the change of the flow direction [82]. The use of direct current (DC) and alternate current (AC) MHD (micro)pumps have been demonstrated [120]. While the application of direct current (DC) (micro)pumps is often associated with bubbles leading to electrode corrosion, they

*Schematic of MHD (micro)pump (A) and its simplification (B). When an electric potential difference V is applied between the electrodes, an electric current circulates through the electrically conducting magnetic fluid perpendicularly to the uniform magnetic field of strength B so that driving Lorentz force F is produced.*

Magnetic separation is being used in many biomedical applications, particularly cellular separation [121]. It is achieved via labeling the desired biological entity, e.g., red blood cells, with biocompatible magnetic nanoparticles. Labeled objects are separated from the base solution by passing the mixture through a high magnetic

*Fm* ¼ 6*πηRm*Δ*υ* (27)

field gradient immobilizing the labeled entities via the magnetic force:

*Magnetic separation. Left: while magnetically labeled objects (yellow) are attracted by the magnet, nonmagnetic objects (gray) and base fluid can be filtered out. Right: after removing the magnetic force captured*

can achieve higher flow rates (**Figures 14** and **15**).

**5.4 Magnetic separation via particle labeling**

*Magnetohydrodynamics in Biomedical Applications DOI: http://dx.doi.org/10.5772/intechopen.87109*

**Figure 13.**

**Figure 14.**

**221**

*objects are recovered.*

Although magnetic drug targeting is appealing, most studies demonstrate only *in vitro* results for superficial organs due to difficulties in manipulating magnetic particles *in vivo* and rapid decrease of magnetic force with distance [79]. While some technical challenges remain, several drug delivery systems have been developed for the treatment of pulmonary disorders [106, 107], cancer [108–110], and cardiovascular diseases [111].

#### **5.3 MHD (micro)pumps**

The concept of MHD (micro)pump is relatively new and was developed by Jang and Lee [112] only in 1999 with an initial goal of applying in drug delivery applications. The working fluid of MHD (micro)pump is magnetic fluids. The term nanofluid was previously introduced by Choi and Eastman [113] in 1995 and describes colloidal suspensions of magnetic nanoparticles or nanotubes (dØ < 100 nm) in a based solution e.g., water, oil, ethylene glycol mixture etc. Magnetic fluids, also called ferro- or nano-fluids, simultaneously exhibit liquid and magnetic properties, leading to the possibility to control their flows with magnetic fields.

In a typical setup, see **Figure 13**, a uniform magnetic field of strength *B* creates a controllable force (Lorentz force) *F* as a driving source in the flow for control and manipulation [114–119]. MHD (micro)pump can be fully described by a combination of Navier–Stokes equations of fluid dynamics and Maxwell's equations of electromagnetism. Considering the absence of moving parts, MHD (micro)pump

*Magnetohydrodynamics in Biomedical Applications DOI: http://dx.doi.org/10.5772/intechopen.87109*

**Figure 13.**

*Schematic of MHD (micro)pump (A) and its simplification (B). When an electric potential difference V is applied between the electrodes, an electric current circulates through the electrically conducting magnetic fluid perpendicularly to the uniform magnetic field of strength B so that driving Lorentz force F is produced.*

possess a simpler fabrication process when compared to mechanical (micro)pumps [120]. MHD (micro)pumps have attracted the attention of many researchers as they could achieve high flow rates and produce bi-directional flow. To use MHD (micro) pumps for drug delivery, however, the stability of the flow rate is critical. The flow rate of MHD (micro)pumps depends on the current and the magnetic flux density [112]. Nevertheless the flux density from a permanent magnet is higher than that of an electromagnet, some authors hypothesized that electromagnets are more useful as their polarity could be reversed, leading to the change of the flow direction [82]. The use of direct current (DC) and alternate current (AC) MHD (micro)pumps have been demonstrated [120]. While the application of direct current (DC) (micro)pumps is often associated with bubbles leading to electrode corrosion, they can achieve higher flow rates (**Figures 14** and **15**).

#### **5.4 Magnetic separation via particle labeling**

Magnetic separation is being used in many biomedical applications, particularly cellular separation [121]. It is achieved via labeling the desired biological entity, e.g., red blood cells, with biocompatible magnetic nanoparticles. Labeled objects are separated from the base solution by passing the mixture through a high magnetic field gradient immobilizing the labeled entities via the magnetic force:

$$F\_m = \mathfrak{G}\pi\eta R\_m \Delta\nu\tag{27}$$

#### **Figure 14.**

*Magnetic separation. Left: while magnetically labeled objects (yellow) are attracted by the magnet, nonmagnetic objects (gray) and base fluid can be filtered out. Right: after removing the magnetic force captured objects are recovered.*

**Figure 15.** *Schematic of the polydimethylsiloxane (PDMS)-glass microfluidic chip for the liquid-metal-based magnetohydrodynamic (MHD) micropump (adapted from [122]).*

where *η* is a base solution viscosity, *Rm* is a radius of magnetic nanoparticle, *Δυ* is a relative velocity of nanoparticle with respect to the base solution.

**6.3 MHD-based stirrer**

*Magnetohydrodynamics in Biomedical Applications DOI: http://dx.doi.org/10.5772/intechopen.87109*

stirring in the microfluidic setting.

known whether any products are in actual use.

**6.4 MHD-based micro-coolers**

is about 10<sup>11</sup> m2

**Figure 16.**

**7. Conclusions**

**223**

Although the characteristic lengths associated with the microfluidic devices are small (e.g., in the order of 100 μm), diffusion alone does not allow sufficiently fast mixing. For example, at room temperature, myosin's diffusion coefficient in water

*A prototype of an MHD microfluidic network. The conduits are labeled with numbers (adapted from [125]).*

large, about 10<sup>3</sup> s. Since Reynolds number (*Re*) of flows in micro-devices are usually very small (*Re* ≪ l), the flows are laminar, well-organized which cause poor mixing. MHD provides us with rather easy means for mixing and stirring. Two different types of MHD stirrers have been reported in the literature. One relies on altering the flow direction to enhance dispersion [126, 127], while another type induces second-

In the current studies, it is shown that MHD is very suitable for providing better

Since MHD can facilitate fluid circulation, it can be used to facilitate cooling. Liquid metals are particularly suitable for this purpose due to their high thermal conductivity, high boiling point temperature, ad large electric conductivity. Since MHD propulsion is easy to implement, miniaturize and does not require mechanical components, it is ideal for micro-cooling applications, such as those required in microelectronics. Although various patents address MHD micro-coolers, it is not

In summary, this chapter covers important aspects of the MHD applied in the biomedical field. A new MFDM with the two-layer layout is proposed to improve

ary flows to improve the mixing. For more details, refer to [126, 127].

/s, and the diffusion time along with a length of 100 μm is very

## **6. Current biomedical devices based on magnetohydrodynamics**

In this section, we describe some of the applications of MHD such as pumps, integrated fluidic networks, stirrer, and micro-coolers.

#### **6.1 MHD-based micro-pumps**

One the best-known application of MHD is in the field of fluid pumping. The device consists of a conduit with two electrodes on either side. When a potential difference is applied across the electrodes, current flux *J* flows through the solution. In the presence of a magnetic field *B***,** the electric field *J* interacts with the magnetic field *B* to generate a Lorenz force *J B* which drives fluid motion.

Below is an example of MHD-based micro-pumped on PDMS platform.

#### **6.2 MHD-based microfluidic networks**

In lab-on-chip applications, it is often necessary to transport fluids and reagents across networks of conduits. Controlling the flow usually requires the use of pumps and valves. It is hard to implement mechanical pumps and valve in a lab-on-chip setting. MHD provides a proper solution that does not require a mechanical component. The basic idea is to equip many of the network's conduits, if not all, with individually controlled electrodes. By careful control of the electrode's currents and in the presence of a magnetic field, it is possible to direct the fluid flow along any desired direction [123, 124].

**Figure 16** shows a simple example of an MDH microfluidic network fabricated using low temperature co-fired ceramic tapes (LTCT). By programming, electrodes can circulate the fluid around the tours at any desired direction and even maintain their temperature allowing for various biological processes like thermal cycling and potentially polymerase chain reaction (PCR) for DNA amplification.

*Magnetohydrodynamics in Biomedical Applications DOI: http://dx.doi.org/10.5772/intechopen.87109*

#### **Figure 16.**

*A prototype of an MHD microfluidic network. The conduits are labeled with numbers (adapted from [125]).*

#### **6.3 MHD-based stirrer**

Although the characteristic lengths associated with the microfluidic devices are small (e.g., in the order of 100 μm), diffusion alone does not allow sufficiently fast mixing. For example, at room temperature, myosin's diffusion coefficient in water is about 10<sup>11</sup> m2 /s, and the diffusion time along with a length of 100 μm is very large, about 10<sup>3</sup> s. Since Reynolds number (*Re*) of flows in micro-devices are usually very small (*Re* ≪ l), the flows are laminar, well-organized which cause poor mixing.

MHD provides us with rather easy means for mixing and stirring. Two different types of MHD stirrers have been reported in the literature. One relies on altering the flow direction to enhance dispersion [126, 127], while another type induces secondary flows to improve the mixing. For more details, refer to [126, 127].

In the current studies, it is shown that MHD is very suitable for providing better stirring in the microfluidic setting.

#### **6.4 MHD-based micro-coolers**

Since MHD can facilitate fluid circulation, it can be used to facilitate cooling. Liquid metals are particularly suitable for this purpose due to their high thermal conductivity, high boiling point temperature, ad large electric conductivity. Since MHD propulsion is easy to implement, miniaturize and does not require mechanical components, it is ideal for micro-cooling applications, such as those required in microelectronics. Although various patents address MHD micro-coolers, it is not known whether any products are in actual use.

#### **7. Conclusions**

In summary, this chapter covers important aspects of the MHD applied in the biomedical field. A new MFDM with the two-layer layout is proposed to improve the correction performance of the DM for full-order aberrations. The results showed the effectiveness of the method to correct full-order aberrations for adaptive optics systems. Furthermore, RBC manipulation by the magnetic field is demonstrated via an external magnetic field produced by a system of two currentcarrying wires. It is shown that cell motion towards and away from the wires, as well as periodic motion in the region between the wires. This approach will likely have application in various fields including molecular biology, medicine, gene engineering, and drug delivery technology.

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MHD plays an integral part in biomedical imaging, ranging from the endogenous magnetization properties of tissue that play an important role in MRI imaging to the ferromagnetic/superparamagnetic fluids that act as contrast enhancing agent in several imaging techniques such as MTI, CT/X-ray and OCT imaging. Several commercial contrast agents are in clinical use today. Research continues to be undertaken on new contrast agents and on the utility of MRI contrast agents in areas such as CT/X-ray and OCT imaging.

Moreover, the same magnetic constructs allow for a combination of enhanced diagnostic imaging (MRI, CT, OCT) and therapeutics (targeted drug delivery). While some technical challenges remain, several drug delivery systems have been successfully developed for treatment of pulmonary disorders, cancer, and cardiovascular diseases. At the end, we briefed current MHD-based devices with potential biomedical applications. MHD-based microfluidics operates at low voltages, can direct the liquid to flow along any desired path without a need for valves and pumps, and continuously circulate the sample in a closed loop, and furthermore can chaotically stir the sample without moving part.
