| // The contents of this file are in the public domain. See LICENSE_FOR_EXAMPLE_PROGRAMS.txt | |
| /* | |
| This is an example illustrating the use of the empirical_kernel_map | |
| from the dlib C++ Library. | |
| This example program assumes you are familiar with some general elements of | |
| the library. In particular, you should have at least read the svm_ex.cpp | |
| and matrix_ex.cpp examples. | |
| Most of the machine learning algorithms in dlib are some flavor of "kernel machine". | |
| This means they are all simple linear algorithms that have been formulated such | |
| that the only way they look at the data given by a user is via dot products between | |
| the data samples. These algorithms are made more useful via the application of the | |
| so-called kernel trick. This trick is to replace the dot product with a user | |
| supplied function which takes two samples and returns a real number. This function | |
| is the kernel that is required by so many algorithms. The most basic kernel is the | |
| linear_kernel which is simply a normal dot product. More interesting, however, | |
| are kernels which first apply some nonlinear transformation to the user's data samples | |
| and then compute a dot product. In this way, a simple algorithm that finds a linear | |
| plane to separate data (e.g. the SVM algorithm) can be made to solve complex | |
| nonlinear learning problems. | |
| An important element of the kernel trick is that these kernel functions perform | |
| the nonlinear transformation implicitly. That is, if you look at the implementations | |
| of these kernel functions you won't see code that transforms two input vectors in | |
| some way and then computes their dot products. Instead you will see a simple function | |
| that takes two input vectors and just computes a single real number via some simple | |
| process. You can basically think of this as an optimization. Imagine that originally | |
| we wrote out the entire procedure to perform the nonlinear transformation and then | |
| compute the dot product but then noticed we could cancel a few terms here and there | |
| and simplify the whole thing down into a more compact and easily evaluated form. | |
| The result is a nice function that computes what we want but we no longer get to see | |
| what those nonlinearly transformed input vectors are. | |
| The empirical_kernel_map is a tool that undoes this. It allows you to obtain these | |
| nonlinearly transformed vectors. It does this by taking a set of data samples from | |
| the user (referred to as basis samples), applying the nonlinear transformation to all | |
| of them, and then constructing a set of orthonormal basis vectors which spans the space | |
| occupied by those transformed input samples. Then if we wish to obtain the nonlinear | |
| version of any data sample we can simply project it onto this orthonormal basis and | |
| we obtain a regular vector of real numbers which represents the nonlinearly transformed | |
| version of the data sample. The empirical_kernel_map has been formulated to use only | |
| dot products between data samples so it is capable of performing this service for any | |
| user supplied kernel function. | |
| The empirical_kernel_map is useful because it is often difficult to formulate an | |
| algorithm in a way that uses only dot products. So the empirical_kernel_map lets | |
| us easily kernelize any algorithm we like by using this object during a preprocessing | |
| step. However, it should be noted that the algorithm is only practical when used | |
| with at most a few thousand basis samples. Fortunately, most datasets live in | |
| subspaces that are relatively low dimensional. So for these datasets, using the | |
| empirical_kernel_map is practical assuming an appropriate set of basis samples can be | |
| selected by the user. To help with this dlib supplies the linearly_independent_subset_finder. | |
| I also often find that just picking a random subset of the data as a basis works well. | |
| In what follows, we walk through the process of creating an empirical_kernel_map, | |
| projecting data to obtain the nonlinearly transformed vectors, and then doing a | |
| few interesting things with the data. | |
| */ | |
| using namespace std; | |
| using namespace dlib; | |
| // ---------------------------------------------------------------------------------------- | |
| // First let's make a typedef for the kind of samples we will be using. | |
| typedef matrix<double, 0, 1> sample_type; | |
| // We will be using the radial_basis_kernel in this example program. | |
| typedef radial_basis_kernel<sample_type> kernel_type; | |
| // ---------------------------------------------------------------------------------------- | |
| void generate_concentric_circles ( | |
| std::vector<sample_type>& samples, | |
| std::vector<double>& labels, | |
| const int num_points | |
| ); | |
| /*! | |
| requires | |
| - num_points > 0 | |
| ensures | |
| - generates two circles centered at the point (0,0), one of radius 1 and | |
| the other of radius 5. These points are stored into samples. labels will | |
| tell you if a given samples is from the smaller circle (its label will be 1) | |
| or from the larger circle (its label will be 2). | |
| - each circle will be made up of num_points | |
| !*/ | |
| // ---------------------------------------------------------------------------------------- | |
| void test_empirical_kernel_map ( | |
| const std::vector<sample_type>& samples, | |
| const std::vector<double>& labels, | |
| const empirical_kernel_map<kernel_type>& ekm | |
| ); | |
| /*! | |
| This function computes various interesting things with the empirical_kernel_map. | |
| See its implementation below for details. | |
| !*/ | |
| // ---------------------------------------------------------------------------------------- | |
| int main() | |
| { | |
| std::vector<sample_type> samples; | |
| std::vector<double> labels; | |
| // Declare an instance of the kernel we will be using. | |
| const kernel_type kern(0.1); | |
| // create a dataset with two concentric circles. There will be 100 points on each circle. | |
| generate_concentric_circles(samples, labels, 100); | |
| empirical_kernel_map<kernel_type> ekm; | |
| // Here we create an empirical_kernel_map using all of our data samples as basis samples. | |
| cout << "\n\nBuilding an empirical_kernel_map with " << samples.size() << " basis samples." << endl; | |
| ekm.load(kern, samples); | |
| cout << "Test the empirical_kernel_map when loaded with every sample." << endl; | |
| test_empirical_kernel_map(samples, labels, ekm); | |
| // create a new dataset with two concentric circles. There will be 1000 points on each circle. | |
| generate_concentric_circles(samples, labels, 1000); | |
| // Rather than use all 2000 samples as basis samples we are going to use the | |
| // linearly_independent_subset_finder to pick out a good basis set. The idea behind this | |
| // object is to try and find the 40 or so samples that best spans the subspace containing all the | |
| // data. | |
| linearly_independent_subset_finder<kernel_type> lisf(kern, 40); | |
| // populate lisf with samples. We have configured it to allow at most 40 samples but this function | |
| // may determine that fewer samples are necessary to form a good basis. In this example program | |
| // it will select only 26. | |
| fill_lisf(lisf, samples); | |
| // Now reload the empirical_kernel_map but this time using only our small basis | |
| // selected using the linearly_independent_subset_finder. | |
| cout << "\n\nBuilding an empirical_kernel_map with " << lisf.size() << " basis samples." << endl; | |
| ekm.load(lisf); | |
| cout << "Test the empirical_kernel_map when loaded with samples from the lisf object." << endl; | |
| test_empirical_kernel_map(samples, labels, ekm); | |
| cout << endl; | |
| } | |
| // ---------------------------------------------------------------------------------------- | |
| void test_empirical_kernel_map ( | |
| const std::vector<sample_type>& samples, | |
| const std::vector<double>& labels, | |
| const empirical_kernel_map<kernel_type>& ekm | |
| ) | |
| { | |
| std::vector<sample_type> projected_samples; | |
| // The first thing we do is compute the nonlinearly projected vectors using the | |
| // empirical_kernel_map. | |
| for (unsigned long i = 0; i < samples.size(); ++i) | |
| { | |
| projected_samples.push_back(ekm.project(samples[i])); | |
| } | |
| // Note that a kernel matrix is just a matrix M such that M(i,j) == kernel(samples[i],samples[j]). | |
| // So below we are computing the normal kernel matrix as given by the radial_basis_kernel and the | |
| // input samples. We also compute the kernel matrix for all the projected_samples as given by the | |
| // linear_kernel. Note that the linear_kernel just computes normal dot products. So what we want to | |
| // see is that the dot products between all the projected_samples samples are the same as the outputs | |
| // of the kernel function for their respective untransformed input samples. If they match then | |
| // we know that the empirical_kernel_map is working properly. | |
| const matrix<double> normal_kernel_matrix = kernel_matrix(ekm.get_kernel(), samples); | |
| const matrix<double> new_kernel_matrix = kernel_matrix(linear_kernel<sample_type>(), projected_samples); | |
| cout << "Max kernel matrix error: " << max(abs(normal_kernel_matrix - new_kernel_matrix)) << endl; | |
| cout << "Mean kernel matrix error: " << mean(abs(normal_kernel_matrix - new_kernel_matrix)) << endl; | |
| /* | |
| Example outputs from these cout statements. | |
| For the case where we use all samples as basis samples: | |
| Max kernel matrix error: 7.32747e-15 | |
| Mean kernel matrix error: 7.47789e-16 | |
| For the case where we use only 26 samples as basis samples: | |
| Max kernel matrix error: 0.000953573 | |
| Mean kernel matrix error: 2.26008e-05 | |
| Note that if we use enough basis samples we can perfectly span the space of input samples. | |
| In that case we get errors that are essentially just rounding noise (Moreover, using all the | |
| samples is always enough since they are always within their own span). Once we start | |
| to use fewer basis samples we may begin to get approximation error. In the second case we | |
| used 26 and we can see that the data doesn't really lay exactly in a 26 dimensional subspace. | |
| But it is pretty close. | |
| */ | |
| // Now let's do something more interesting. The following loop finds the centroids | |
| // of the two classes of data. | |
| sample_type class1_center; | |
| sample_type class2_center; | |
| for (unsigned long i = 0; i < projected_samples.size(); ++i) | |
| { | |
| if (labels[i] == 1) | |
| class1_center += projected_samples[i]; | |
| else | |
| class2_center += projected_samples[i]; | |
| } | |
| const int points_per_class = samples.size()/2; | |
| class1_center /= points_per_class; | |
| class2_center /= points_per_class; | |
| // Now classify points by which center they are nearest. Recall that the data | |
| // is made up of two concentric circles. Normally you can't separate two concentric | |
| // circles by checking which points are nearest to each center since they have the same | |
| // centers. However, the kernel trick makes the data separable and the loop below will | |
| // perfectly classify each data point. | |
| for (unsigned long i = 0; i < projected_samples.size(); ++i) | |
| { | |
| double distance_to_class1 = length(projected_samples[i] - class1_center); | |
| double distance_to_class2 = length(projected_samples[i] - class2_center); | |
| bool predicted_as_class_1 = (distance_to_class1 < distance_to_class2); | |
| // Now print a message for any misclassified points. | |
| if (predicted_as_class_1 == true && labels[i] != 1) | |
| cout << "A point was misclassified" << endl; | |
| if (predicted_as_class_1 == false && labels[i] != 2) | |
| cout << "A point was misclassified" << endl; | |
| } | |
| // Next, note that classifying a point based on its distance between two other | |
| // points is the same thing as using the plane that lies between those two points | |
| // as a decision boundary. So let's compute that decision plane and use it to classify | |
| // all the points. | |
| sample_type plane_normal_vector = class1_center - class2_center; | |
| // The point right in the center of our two classes should be on the deciding plane, not | |
| // on one side or the other. This consideration brings us to the formula for the bias. | |
| double bias = dot((class1_center+class2_center)/2, plane_normal_vector); | |
| // Now classify points by which side of the plane they are on. | |
| for (unsigned long i = 0; i < projected_samples.size(); ++i) | |
| { | |
| double side = dot(plane_normal_vector, projected_samples[i]) - bias; | |
| bool predicted_as_class_1 = (side > 0); | |
| // Now print a message for any misclassified points. | |
| if (predicted_as_class_1 == true && labels[i] != 1) | |
| cout << "A point was misclassified" << endl; | |
| if (predicted_as_class_1 == false && labels[i] != 2) | |
| cout << "A point was misclassified" << endl; | |
| } | |
| // It would be nice to convert this decision rule into a normal decision_function object and | |
| // dispense with the empirical_kernel_map. Happily, it is possible to do so. Consider the | |
| // following example code: | |
| decision_function<kernel_type> dec_funct = ekm.convert_to_decision_function(plane_normal_vector); | |
| // The dec_funct now computes dot products between plane_normal_vector and the projection | |
| // of any sample point given to it. All that remains is to account for the bias. | |
| dec_funct.b = bias; | |
| // now classify points by which side of the plane they are on. | |
| for (unsigned long i = 0; i < samples.size(); ++i) | |
| { | |
| double side = dec_funct(samples[i]); | |
| // And let's just check that the dec_funct really does compute the same thing as the previous equation. | |
| double side_alternate_equation = dot(plane_normal_vector, projected_samples[i]) - bias; | |
| if (abs(side-side_alternate_equation) > 1e-14) | |
| cout << "dec_funct error: " << abs(side-side_alternate_equation) << endl; | |
| bool predicted_as_class_1 = (side > 0); | |
| // Now print a message for any misclassified points. | |
| if (predicted_as_class_1 == true && labels[i] != 1) | |
| cout << "A point was misclassified" << endl; | |
| if (predicted_as_class_1 == false && labels[i] != 2) | |
| cout << "A point was misclassified" << endl; | |
| } | |
| } | |
| // ---------------------------------------------------------------------------------------- | |
| void generate_concentric_circles ( | |
| std::vector<sample_type>& samples, | |
| std::vector<double>& labels, | |
| const int num | |
| ) | |
| { | |
| sample_type m(2,1); | |
| samples.clear(); | |
| labels.clear(); | |
| dlib::rand rnd; | |
| // make some samples near the origin | |
| double radius = 1.0; | |
| 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)); | |
| samples.push_back(m); | |
| labels.push_back(1); | |
| } | |
| // make some samples in a circle around the origin but far away | |
| radius = 5.0; | |
| 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)); | |
| samples.push_back(m); | |
| labels.push_back(2); | |
| } | |
| } | |
| // ---------------------------------------------------------------------------------------- | |