dlib/examples/kkmeans_ex.cpp

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/*
This is an example illustrating the use of the kkmeans object
from the dlib C++ Library.
The kkmeans object is an implementation of a kernelized k-means clustering
algorithm. It is implemented by using the kcentroid object to represent
each center found by the usual k-means clustering algorithm.
So this object allows you to perform non-linear clustering in the same way
a svm classifier finds non-linear decision surfaces.
This example will make points from 3 classes and perform kernelized k-means
clustering on those points.
The classes are as follows:
- points very close to the origin
- points on the circle of radius 10 around the origin
- points that are on a circle of radius 4 but not around the origin at all
*/
#include <iostream>
#include <vector>
#include "dlib/svm.h"
#include "dlib/rand.h"
using namespace std;
using namespace dlib;
int main()
{
// Here we declare that our samples will be 2 dimensional column vectors.
typedef matrix<double,2,1> sample_type;
// Now we are making a typedef for the kind of kernel we want to use. I picked the
// radial basis kernel because it only has one parameter and generally gives good
// results without much fiddling.
typedef radial_basis_kernel<sample_type> kernel_type;
// Here we declare an instance of the kcentroid object. The first argument to the constructor
// is the kernel we wish to use. The second is a parameter that determines the numerical
// accuracy with which the object will perform part of the learning algorithm. Generally
// smaller values give better results but cause the algorithm to run slower. You just have
// to play with it to decide what balance of speed and accuracy is right for your problem.
// Here we have set it to 0.01.
kcentroid<kernel_type> kc(kernel_type(0.1),0.01);
// Now we make an instance of the kkmeans object and tell it to use kcentroid objects
// that are configured with the parameters from the kc object we defined above.
kkmeans<kernel_type> test(kc);
std::vector<sample_type> samples;
std::vector<sample_type> initial_centers;
sample_type m;
dlib::rand::float_1a rnd;
// we will make 50 points from each class
const long num = 50;
// make some samples near the origin
double radius = 0.5;
for (long i = 0; i < num; ++i)
{
double sign = 1;
if (rnd.get_random_double() < 0.5)
sign = -1;
m(0) = 2*radius*rnd.get_random_double()-radius;
m(1) = sign*sqrt(radius*radius - m(0)*m(0));
// add this sample to our set of samples we will run k-means
samples.push_back(m);
}
// make some samples in a circle around the origin but far away
radius = 10.0;
for (long i = 0; i < num; ++i)
{
double sign = 1;
if (rnd.get_random_double() < 0.5)
sign = -1;
m(0) = 2*radius*rnd.get_random_double()-radius;
m(1) = sign*sqrt(radius*radius - m(0)*m(0));
// add this sample to our set of samples we will run k-means
samples.push_back(m);
}
// make some samples in a circle around the point (25,25)
radius = 4.0;
for (long i = 0; i < num; ++i)
{
double sign = 1;
if (rnd.get_random_double() < 0.5)
sign = -1;
m(0) = 2*radius*rnd.get_random_double()-radius;
m(1) = sign*sqrt(radius*radius - m(0)*m(0));
// translate this point away from the origin
m(0) += 25;
m(1) += 25;
// add this sample to our set of samples we will run k-means
samples.push_back(m);
}
// tell the kkmeans object we made that we want to run k-means with k set to 3.
// (i.e. we want 3 clusters)
test.set_number_of_centers(3);
// You need to pick some initial centers for the k-means algorithm. So here
// we will use the dlib::pick_initial_centers() function which tries to find
// n points that are far apart (basically).
pick_initial_centers(3, initial_centers, samples, test.get_kernel());
// now run the k-means algorithm on our set of samples. Note that the train function expects
// its arguments to be dlib::matrix objects so since we have our samples in std::vector objects
// we need to turn them into matrix objects. The vector_to_matrix() function does this for us.
test.train(vector_to_matrix(samples),vector_to_matrix(initial_centers));
// now loop over all our samples and print out their predicted class. In this example
// all points are correctly identified.
for (unsigned long i = 0; i < samples.size()/3; ++i)
{
cout << test(samples[i]) << " ";
cout << test(samples[i+num]) << " ";
cout << test(samples[i+2*num]) << "\n";
}
}