1. Introduction

Humanity has been inspired from nature along its evolution, since ancient times. Each lively being has its own rules and magnificent knowledge. This capability of all lively beings gives inspiration to the human being in order to find solutions to the problems that he/she faces.

Most of the engineering designs have been inspired by nature. With the design of high-speed trains, the problem was "boom effect," created by the trains, when entering the tunnel. This noise was because of the air pressure created on the front side of the train. This problem was solved with an excellent nature design, with kingfisher beak [1].

For more than half a century, algorithms have also been using inspirations from nature for computing and solving the problems related to computer science. The first optimization algorithm mimicking nature was genetic algorithm (GA). Genetic algorithm used the selection, mutation and crossover, finding the diverse solutions to complex problems [2]. Today, we have very powerful algorithms inspired by nature to optimize the problems.

Particle swarm optimization (PSO) is another population-based algorithm inspired by nature. Improved by James Kennedy and Russell C. Eberhart, PSO simulates the bird flocking and fish schooling foraging behaviors for the solution of a continuous optimization problem [3].

Biogeography-based optimization (BBO) algorithm is an evolutionary algorithm that simulates the formation of the biogeographies. BBO, improved by Simon [4], simulates the habitants' immigration or emigration behaviors according to the suitability of the habitat for them.

Gray wolf optimizer (GWO) is also a nature-inspired population-based optimization algorithm originally proposed for the solution of the continuous optimization problems. GWO simulates the hunting behaviors of the gray wolves [5].

Optimization is a kind of programming, solving several problems including function minimization, clustering and feature selection. Clustering is an unsupervised machine learning method that groups the entities with a given number of categories according to their similarities. It is certain that clustering must maximize the similarities of the objects inside the same groups and also maximize the dissimilarity among the other groups' objects. Clustering can be defined as an optimization problem with this perspective. A classical example of clustering is given in Figure 1.

Clustering is a very common technique used for data analysis especially for the applications of summarization, abstracting the data and segmentation [6].

Figure 1. Patient clusters according to their systole and diastole blood pressures.

A very common application of clustering is data analysis [7]. Cluster centroids give brief information for the attributes of each cluster. This knowledge is used for information discovery and general classification. Another application of clustering is collaborative filtering [8]. The users, grouped in the same cluster, are accepted similar likes and dislikes. Data and image segmentation are another application of clustering [9].

Today, clustering is commonly used for biological data [10], medical data [11], social network [12, 13] and wireless sensor network data [14] and big data [15] for different kinds of applications stated above.

In this chapter, the reader will learn how he/she can apply optimization algorithms for clustering problems. In the next section, the clustering is defined as an optimization problem. Nature-inspired optimization algorithms, genetic algorithm, particle swarm optimization algorithm, biogeography-based optimization algorithm and gray wolf optimization algorithm have been explained in Section 3. Clustering with nature-inspired algorithms has been studied for a very basic and popular dataset given in Section 4. And the results have been submitted in Section 5.

### 2. Clustering as an optimization problem

Clustering is grouping the data into the clusters according to their similarities. Similarity is defined mathematically with a measure. The more the attributes of two data are near to each other, the less distance is between data. Namely, distance is inversely proportional to similarity. Different distance measures have been defined for clustering. Euclidean, Manhattan, Mahalanobis and Minkowski are the most [16, 17] used distance metrics. The most popular metric for continuous features is the Euclidean distance [18]. Euclidean distance is used while clusters are compact and the dimension of the data is low. For large dimension, Minkowski distance is preferred.

In this chapter, the objective function is defined based on Euclidean distance metric for comparison. Let us assume the two data points in D dimension space, X and Y. The distance between X and Y is calculated with Euclid and pth order of Minkowski distance, as given in Eqs. (1) and (2), respectively.

Introductory Chapter: Clustering with Nature-Inspired Optimization Algorithms DOI: http://dx.doi.org/10.5772/intechopen.91678

Figure 2. Minimum distance for optimum centroid positions.

$$\text{De} = \sqrt{\sum\_{i=1}^{D} \left(\mathbf{X}\_{i} - \mathbf{Y}\_{i}\right)^{2}} \tag{1}$$

$$\text{Dm} = \sqrt[p]{\sum\_{i=1}^{D} |\mathbf{X}\_i - \mathbf{Y}\_i|^p} \tag{2}$$

The object of clustering is to assign data to the clusters that minimize the sum of the distances from the data to centroids of the clusters. So the objective function with Euclid distance is defined as given in Eq. (3).

$$\mathbf{F\_{obj}} = \sqrt{\sum\_{j=1}^{K} \sum\_{k=1}^{D} \left(\mathbf{X\_{ik}} - \mathbf{C\_{jk}}\right)^2} \text{ for } \forall \, \mathbf{X\_i} \in \mathbf{C\_j} \tag{3}$$

where N presents the number of data; K presents the number of fully separated clusters; D presents the number of dimension of data; Xik presents the ith data kth feature; Cjk 1, 2, … , K presents the center of the cluster j of kth feature.

The positions of centroids are independent variables. So if applied data dimension is D and the number of cluster is K, the number of independent variables for objective function is KXD. Namely, K centroid positions with D dimension are the independent variables of objective function. The objective is to find centroid positions that minimize the distance. The calculation of the objective function is shown schematically in Figure 2.

### 3. Nature-inspired optimization algorithms

In this chapter, some of the most cited and successful algorithms have been selected for comparing the clustering performances. Genetic algorithm, particle swarm optimization algorithm, biogeography-based optimization algorithm and gray wolf optimization algorithm have been selected. These algorithms have common features. All of them run a group of solutions.

Each solution is called as individual, particle, island and wolf, respectively. In this chapter, the number of solutions is given as S. Each solution has independent variables. So, the number of independent variables is called V, which is equal to KXD for clustering problem. The clustering problem is handled as an unconstrained optimization problem in this chapter as given in Eq. (4).

$$\mathbf{F}\_{\text{obj}} = \mathbf{f}(\mathbf{C}\_1, \mathbf{C}\_2, \dots \mathbf{C}\_N) \tag{4}$$


#### Table 1.

Population-based optimization algorithms and their naming for common terms of optimization.

In the problem, the initial cluster centroids as independent variables are assigned randomly between the lower and upper values of data. After the independent variables are created randomly, the objective function value is calculated as given in Eqs. (3) and (4). Attaining for S initial solution, V random cluster centroids for each S solution are assigned. Solutions are called Fobj1, Fobj2, … , FobjS. The optimization algorithm starts with these initial solutions and evaluates and improves the solutions, until the stopping condition is true. From one iteration to the other, the algorithm converges to the best solution.

Before the algorithms are explained in detail, the general properties of population (swarm)-based optimization algorithms and specific namings are listed in Table 1.

#### 3.1 Genetic algorithm

Genetic algorithm is one of the most studied and powerful optimization algorithms, used for the solution of both combinatorial and continuous optimization problems. The main idea behind GA is "survival of the fittest." So, the algorithm is based on the evolution of the individuals from one generation to the next.

After the optimization problem is modeled and its independent variables, constraints and objective function are specified, genetic algorithm parameters are adjusted for the problem. After the algorithm starts with an initial population, fitness value of each individual in the population is calculated. The selection process for the next generation is realized with some selection methods in such a way that best individuals have more chance than the worse ones. Tournament selection, roulette wheel selection and rank selection are some of the selection methods [2].

After selection of the parents, crossover is applied for the parents. In GA, in reverse to the real evolution, the number of population is constant, the number of child is selected as two, and the best individuals are copied like genetic cloning. Crossover operation is applied with a crossover rate. Zero crossover rate means the children will be the copy of their parents, one crossover rate means the children will be completely different from their parents. After crossover, mutation is applied with a very low mutation rate. Mutation is the permanent changes in genes, in order not to get trapped in local minimum. After the new generation is attained, the fittest ones are selected among the latest population. And algorithm stops after a number of generations. Stopping condition is generally selected as maximum number of generation.

The pseudocode of GA is given in Table 2.

Introductory Chapter: Clustering with Nature-Inspired Optimization Algorithms DOI: http://dx.doi.org/10.5772/intechopen.91678


#### end

Table 2. The pseudocode of GA.

#### 3.2 Particle swarm optimization

PSO is another most studied optimization algorithm, used for the solution of continuous optimization problems introduced by Eberhart and Kennedy [19]. The bird flocking or fish schooling moves in a multidimensional space in such a way that they find the food in a shortest path. The main idea behind the PSO is the behavior of the particles in a swarm. Each particle has a position in a multidimensional space, and they exchange information among them. The particles move in a space using social and cognitive information. When the algorithm stops, the best position has been found.

The algorithm starts after initial positions and initial velocities of particles have been assigned. The dimension size of the particle position in PSO is the number of independent variables. Fitness value of each particle in the swarm has been calculated. The particles update their velocities according to velocity formula. Although two different velocity formulas have been defined, there are two main parameters in both formulas, representing the social and cognitive behaviors of the particles. In swarm, particles update their velocities according to both the best position in the swarm and to their best. In this way, from one iteration to the other, PSO converges the optimum solution of the problems. PSO is the fast convergent optimization algorithm and requires less memory and there are a few parameters to adapt. In the first velocity formula, there was no inertia weight [19]. Inertia weight is introduced by Shi and Eberhart [20]. Inertia weight balances the algorithm's local and global search ability. Inertia weight specifies the percentage of contribution of previous velocity to its current velocity. The velocity and position formulas for PSO are given in Eqs. (5) and (6), respectively.

$$\boldsymbol{v}\_{i}^{k+1} = \boldsymbol{u}\boldsymbol{v}\_{i}^{k} + c\_{1}\boldsymbol{r}\boldsymbol{n}\boldsymbol{n}\boldsymbol{d}\left(\boldsymbol{p}\_{\text{best}\_{i}} - \boldsymbol{\pi}\_{i}^{k}\right) + c\_{2}\boldsymbol{r}\boldsymbol{n}\boldsymbol{d}\left(\boldsymbol{g}\_{\text{best}} - \boldsymbol{\pi}\_{i}^{k}\right) \tag{5}$$

$$\mathbf{x}\_{i}^{k+1} = \mathbf{x}\_{i}^{k} + \mathbf{v}\_{i}^{k+1} \tag{6}$$

where w presents the inertia weight, v<sup>k</sup> <sup>i</sup> presents the velocity of ith particle for kth iteration, x<sup>k</sup> <sup>i</sup> presents the position of ith particle for kth iteration, pbesti presents the local best solution of ith particle, gbest presents the global best solution, rand() presents uniform random number, and c<sup>1</sup> and c<sup>2</sup> present the cognitive and social parameters.

Constriction factor (K) is used by Clerc [21]. Constriction factor assures the convergence of the PSO. The velocity and position formulas with constriction factor for PSO are given in Eqs. (7)–(9), respectively.

$$v\_{i}^{k+1} = K \left( v\_{i}^{k} + \varphi\_{1} rand \left( p\_{best}^{\ k} - \boldsymbol{\pi}\_{i}^{k} \right) + \varphi\_{2} rand \left( \mathbf{g}\_{best} - \boldsymbol{\pi}\_{i}^{k} \right) \right) \tag{7}$$

$$K = \frac{2}{\left| 2 - \varrho - \sqrt{\varrho^2 - 4\varrho} \right|} \varphi = \varrho\_1 + \varrho\_2 \rho > 4 \tag{8}$$

$$\mathbf{x}\_{i}^{k+1} = \mathbf{x}\_{i}^{k} + \boldsymbol{v}\_{i}^{k+1} \tag{9}$$

where φ<sup>1</sup> and φ<sup>2</sup> are individual and social parameters. The pseudocode of PSO is given in Table 3.

#### 3.3 Biogeography-based optimization

BBO applies biogeography mathematical foundations to solve the optimization problems. Biogeography observes the distribution of species in geographic space and tries to find the reason of the biodiversities in geography. Species migrates from one habitat to the other, trying to find the most suitable habitat. So if this biogeographic movement is simulated well, it can be applicable to solve an optimization problem. Geographical areas that are suitable for biological species are said to have a high habitat suitability index (HSI) [4]. The features, such as land area, temperature and rainfall show the suitability of the biogeography and called as suitability index variables (SIVs) independent variables of the optimization problem and HSI represents the fitness function. Species living in a geography that has high HSI emigrates to nearby habitats, which has low species, since this biogeography is already nearly saturated. BBO has been used for clustering in some studies [22, 23]. As seen in Table 3, since BBO algorithm uses three loops, BBO runs slower than the other algorithms like PSO and GWO. So some strategies have been used in the studies that make BBO run faster. The pseudocode of BBO is given in Table 4.

#### 3.4 Gray wolf optimizer

Gray wolf optimizer, a population-based, nature-inspired algorithm, simulates the hunting behaviors of gray wolves [5]. Gray wolves live in groups, and there is a hierarchy among them. Their hunting strategy has three steps: encircling the prey, circling the prey and hunting the prey. This process is adapted for the optimization problem solution. The wolves move in d-dimensional space in order to search their prey. The position of the wolves presents d the independent variables. After they find the prey, they encircle their preys and lastly they hunt. Encircling behavior presents the converging of the solution and hunting presents the optimum point. The algorithms start with the creation of the initial positions of the wolves. The positions are evaluated with the fitness function. Since there is no knowledge about the position of the prey in problem, the best three solutions are selected, in order to

```
Create P initial particle position
Do
    For I = 1:P
         Evaluate Fitness function values
         If fitness(Pi) < Pbest(I)
Pbest(I) = Pi
         end
         If fitness(Pi) < Gbest
Gbest = Pi
     end
   end
Until stopping condition is true
```
#### Table 3. The pseudocode of PSO.

Introductory Chapter: Clustering with Nature-Inspired Optimization Algorithms DOI: http://dx.doi.org/10.5772/intechopen.91678

Initialize the SIVs of N habitat Calculate HSI values of each habitat Sort them and find best HSI for i = 1 to maximum\_iteration for i = 1:N for k = 1:dim CandidateNewHabitat = Habitat Select Source Habitat Apply migration with a probability Apply mutation with a probability end end Calculate HSI values for new habitat Sort CandidateNew Habitat Create NewHabitat from Habitat bests and CandidateNewHabitat Update Best Solution Ever Found End

#### Table 4.

The pseudocode of BBO.

```
Initialize the Gray Wolf Population
Initialize parameter A,a,C
Calculate each wolf fitness value
Specify first,second and third best solutions
while (t < max_iteration)
     for each wolf
        Update the position
end
   Update a,A,C
   Update fitness of each wolf
   Update first, second and third best solutions
   t = t + 1;
end
```
#### Table 5. The pseudocode of GWO.

update the next positions of the wolves. Instead of saving only one global best solution in memory, GWO saves three best solutions. This property makes the algorithm powerful for global best finding. GWO is applied successfully in feature selection [24], training multilayer perceptrons [25] and clustering [26–28].

The pseudocode of GWO is given in Table 5.

## 4. Clustering performances of the algorithms

As stated in another chapter, the object of clustering is to assign data to the clusters that minimize the sum of the distances from the data to centroids of the clusters. So the objective function value is accepted evolution metric for clustering. In Tables 8 and 9, Fobj column is given for the other algorithms' clustering performance comparison. In this section, the clustering performances of the algorithms have been compared for IRIS dataset. The parameters, used in the simulation, have been given in Table 6.

The benchmark dataset is quite well-known as IRIS dataset [29]. The dataset has four attributes and three class as given in Table 7.

All simulations have been implemented on a personal computer with Intel Core Duo 3.0 GHz and 8 GB RAM. Each algorithm has been simulated 30 times and

### Introduction to Data Science and Machine Learning


#### Table 6.

Parameters of the optimization algorithms.


#### Table 7.

The attributes and classes of the IRIS dataset.

results have been saved. The average, best and worst clustering performances have been calculated from 30 runs. As it has been seen, population size and the maximum iteration number are two important parameters, in order to get best solutions in the nature-inspired optimization algorithms. So in order to get optimum values, two parameters must be selected in such a way that both solution time and optimum value must be optimized. With this aim, firstly population size is selected as constant and the number of maximum iteration is changed as 100, 200, 300, 400 and 500. But only the results for iteration number 100, 200 and 300 have been shown in Table 8, so that the rows of the table aren't too many.

Secondly, population size is changed as 10, 20 and 30, while maximum iteration number is constant and equal to 200. The results have been shown in Table 9.

As it has been seen in Table 8, the minimum objective value for iteration number = 100 and the population size = 5 belongs to GWO. PSO is the second best algorithm for clustering. These minimum values found with GWO and PSO are not far from the minimum distance found with k-means. But the average values are quite far from the minimum objective value. So it can be said that both the population size and iteration number are not enough for finding near optimum values for clustering problems [30]. So the algorithms are not stable for these parameters. Average objective values for iteration numbers have been shown in Figure 3.

As it has been seen in Figure 3, PSO and GWO are fast convergent algorithms. But GA and BBO are also showing similar characteristics, since they have a lot of parameters like mutation rate.



Table 8. IRIS clustering results of the algorithms for population size = 5.


Table 9. IRIS clustering results of the algorithms for iteration number = 200. Introductory Chapter: Clustering with Nature-Inspired Optimization Algorithms DOI: http://dx.doi.org/10.5772/intechopen.91678

#### Figure 3.

Average objective values for iteration numbers = 100, 200, 300, 400 and 500.

Figure 4. Average objective function value for population size = 5, 10, 20 and 30.

PSO is the best algorithm for clustering the data with minimum distance from centroid to each data for iteration number = 200. GWO is the second best algorithm for data clustering.

GWO is the best algorithm for clustering the data with minimum distance from centroid to each data for iteration number = 300 and PSO is the second. GWO and PSO are more stable than BBO and GA.

But it has been seen that this population size (population size = 5) is not enough for the algorithms' convergence to the minimum distance for clustering.

As it has been seen in Table 9, the best stable values belong to PSO and GWO. But four of the algorithms are working well under the conditions population

Figure 5. Average clustering time values for population size = 5, 10, 20 and 30.

Figure 6. Average clustering time values for iteration number = 100–500.

size = 30 and iteration number = 200. But clustering time is increasing with the number of population size. Clustering time and objective function value for population size = 5, 10, 20 and 30 have been shown in Figures 4 and 5, respectively.

As it has been seen in Figure 4, PSO and GWO can produce near optimal solutions for small population size.

However, BBO and GA require many people to effectively operate their mechanisms, such as crossing and mutation. GA and BBO catch the performances of the PSO and BBO after the population size is more than 20.

As it has been seen in Figure 5, BBO clustering time is highly increasing with the population size. Solution time for PSO, GWO and GA is changing less, while the population size increase.

Lastly, clustering time variation with iteration number has been shown in Figure 6. As it has been seen, GA and PSO clustering time are robust than BBO and GWO, depending on the number of iterations.

As an example, GWO convergence curves for 30 runs have been shown in Figure 7.

Introductory Chapter: Clustering with Nature-Inspired Optimization Algorithms DOI: http://dx.doi.org/10.5772/intechopen.91678

Figure 7. GWO convergence curves for clustering IRIS data.
