Adaline Learning
P
K
/**
* \addtogroup machine_learning Machine Learning Algorithms
* @{
* \file
* \brief [Adaptive Linear Neuron
* (ADALINE)](https://en.wikipedia.org/wiki/ADALINE) implementation
*
* \author [Krishna Vedala](https://github.com/kvedala)
*
* \details
* <a href="https://commons.wikimedia.org/wiki/File:Adaline_flow_chart.gif"><img
* src="https://upload.wikimedia.org/wikipedia/commons/b/be/Adaline_flow_chart.gif"
* alt="Structure of an ADALINE network. Source: Wikipedia"
* style="width:200px; float:right;"></a>
*
* ADALINE is one of the first and simplest single layer artificial neural
* network. The algorithm essentially implements a linear function
* \f[ f\left(x_0,x_1,x_2,\ldots\right) =
* \sum_j x_jw_j+\theta
* \f]
* where \f$x_j\f$ are the input features of a sample, \f$w_j\f$ are the
* coefficients of the linear function and \f$\theta\f$ is a constant. If we
* know the \f$w_j\f$, then for any given set of features, \f$y\f$ can be
* computed. Computing the \f$w_j\f$ is a supervised learning algorithm wherein
* a set of features and their corresponding outputs are given and weights are
* computed using stochastic gradient descent method.
*/
#include <array>
#include <cassert>
#include <climits>
#include <cmath>
#include <cstdlib>
#include <ctime>
#include <iostream>
#include <numeric>
#include <vector>
/** Maximum number of iterations to learn */
constexpr int MAX_ITER = 500; // INT_MAX
/** \namespace machine_learning
* \brief Machine learning algorithms
*/
namespace machine_learning {
class adaline {
public:
/**
* Default constructor
* \param[in] num_features number of features present
* \param[in] eta learning rate (optional, default=0.1)
* \param[in] convergence accuracy (optional,
* default=\f$1\times10^{-5}\f$)
*/
explicit adaline(int num_features, const double eta = 0.01f,
const double accuracy = 1e-5)
: eta(eta), accuracy(accuracy) {
if (eta <= 0) {
std::cerr << "learning rate should be positive and nonzero"
<< std::endl;
std::exit(EXIT_FAILURE);
}
weights = std::vector<double>(
num_features +
1); // additional weight is for the constant bias term
// initialize with random weights in the range [-50, 49]
for (double &weight : weights) weight = 1.f;
// weights[i] = (static_cast<double>(std::rand() % 100) - 50);
}
/**
* Operator to print the weights of the model
*/
friend std::ostream &operator<<(std::ostream &out, const adaline &ada) {
out << "<";
for (int i = 0; i < ada.weights.size(); i++) {
out << ada.weights[i];
if (i < ada.weights.size() - 1) {
out << ", ";
}
}
out << ">";
return out;
}
/**
* predict the output of the model for given set of features
* \param[in] x input vector
* \param[out] out optional argument to return neuron output before
* applying activation function (optional, `nullptr` to ignore) \returns
* model prediction output
*/
int predict(const std::vector<double> &x, double *out = nullptr) {
if (!check_size_match(x)) {
return 0;
}
double y = weights.back(); // assign bias value
// for (int i = 0; i < x.size(); i++) y += x[i] * weights[i];
y = std::inner_product(x.begin(), x.end(), weights.begin(), y);
if (out != nullptr) { // if out variable is provided
*out = y;
}
return activation(y); // quantizer: apply ADALINE threshold function
}
/**
* Update the weights of the model using supervised learning for one
* feature vector
* \param[in] x feature vector
* \param[in] y known output value
* \returns correction factor
*/
double fit(const std::vector<double> &x, const int &y) {
if (!check_size_match(x)) {
return 0;
}
/* output of the model with current weights */
int p = predict(x);
int prediction_error = y - p; // error in estimation
double correction_factor = eta * prediction_error;
/* update each weight, the last weight is the bias term */
for (int i = 0; i < x.size(); i++) {
weights[i] += correction_factor * x[i];
}
weights[x.size()] += correction_factor; // update bias
return correction_factor;
}
/**
* Update the weights of the model using supervised learning for an
* array of vectors.
* \param[in] X array of feature vector
* \param[in] y known output value for each feature vector
*/
template <size_t N>
void fit(std::array<std::vector<double>, N> const &X,
std::array<int, N> const &Y) {
double avg_pred_error = 1.f;
int iter = 0;
for (iter = 0; (iter < MAX_ITER) && (avg_pred_error > accuracy);
iter++) {
avg_pred_error = 0.f;
// perform fit for each sample
for (int i = 0; i < N; i++) {
double err = fit(X[i], Y[i]);
avg_pred_error += std::abs(err);
}
avg_pred_error /= N;
// Print updates every 200th iteration
// if (iter % 100 == 0)
std::cout << "\tIter " << iter << ": Training weights: " << *this
<< "\tAvg error: " << avg_pred_error << std::endl;
}
if (iter < MAX_ITER) {
std::cout << "Converged after " << iter << " iterations."
<< std::endl;
} else {
std::cout << "Did not converge after " << iter << " iterations."
<< std::endl;
}
}
/** Defines activation function as Heaviside's step function.
* \f[
* f(x) = \begin{cases}
* -1 & \forall x \le 0\\
* 1 & \forall x > 0
* \end{cases}
* \f]
* @param x input value to apply activation on
* @return activation output
*/
int activation(double x) { return x > 0 ? 1 : -1; }
private:
/**
* convenient function to check if input feature vector size matches the
* model weights size
* \param[in] x fecture vector to check
* \returns `true` size matches
* \returns `false` size does not match
*/
bool check_size_match(const std::vector<double> &x) {
if (x.size() != (weights.size() - 1)) {
std::cerr << __func__ << ": "
<< "Number of features in x does not match the feature "
"dimension in model!"
<< std::endl;
return false;
}
return true;
}
const double eta; ///< learning rate of the algorithm
const double accuracy; ///< model fit convergence accuracy
std::vector<double> weights; ///< weights of the neural network
};
} // namespace machine_learning
using machine_learning::adaline;
/** @} */
/**
* test function to predict points in a 2D coordinate system above the line
* \f$x=y\f$ as +1 and others as -1.
* Note that each point is defined by 2 values or 2 features.
* \param[in] eta learning rate (optional, default=0.01)
*/
void test1(double eta = 0.01) {
adaline ada(2, eta); // 2 features
const int N = 10; // number of sample points
std::array<std::vector<double>, N> X = {
std::vector<double>({0, 1}), std::vector<double>({1, -2}),
std::vector<double>({2, 3}), std::vector<double>({3, -1}),
std::vector<double>({4, 1}), std::vector<double>({6, -5}),
std::vector<double>({-7, -3}), std::vector<double>({-8, 5}),
std::vector<double>({-9, 2}), std::vector<double>({-10, -15})};
std::array<int, N> y = {1, -1, 1, -1, -1,
-1, 1, 1, 1, -1}; // corresponding y-values
std::cout << "------- Test 1 -------" << std::endl;
std::cout << "Model before fit: " << ada << std::endl;
ada.fit<N>(X, y);
std::cout << "Model after fit: " << ada << std::endl;
int predict = ada.predict({5, -3});
std::cout << "Predict for x=(5,-3): " << predict;
assert(predict == -1);
std::cout << " ...passed" << std::endl;
predict = ada.predict({5, 8});
std::cout << "Predict for x=(5,8): " << predict;
assert(predict == 1);
std::cout << " ...passed" << std::endl;
}
/**
* test function to predict points in a 2D coordinate system above the line
* \f$x+3y=-1\f$ as +1 and others as -1.
* Note that each point is defined by 2 values or 2 features.
* The function will create random sample points for training and test purposes.
* \param[in] eta learning rate (optional, default=0.01)
*/
void test2(double eta = 0.01) {
adaline ada(2, eta); // 2 features
const int N = 50; // number of sample points
std::array<std::vector<double>, N> X;
std::array<int, N> Y{}; // corresponding y-values
// generate sample points in the interval
// [-range2/100 , (range2-1)/100]
int range = 500; // sample points full-range
int range2 = range >> 1; // sample points half-range
for (int i = 0; i < N; i++) {
double x0 = (static_cast<double>(std::rand() % range) - range2) / 100.f;
double x1 = (static_cast<double>(std::rand() % range) - range2) / 100.f;
X[i] = std::vector<double>({x0, x1});
Y[i] = (x0 + 3. * x1) > -1 ? 1 : -1;
}
std::cout << "------- Test 2 -------" << std::endl;
std::cout << "Model before fit: " << ada << std::endl;
ada.fit(X, Y);
std::cout << "Model after fit: " << ada << std::endl;
int N_test_cases = 5;
for (int i = 0; i < N_test_cases; i++) {
double x0 = (static_cast<double>(std::rand() % range) - range2) / 100.f;
double x1 = (static_cast<double>(std::rand() % range) - range2) / 100.f;
int predict = ada.predict({x0, x1});
std::cout << "Predict for x=(" << x0 << "," << x1 << "): " << predict;
int expected_val = (x0 + 3. * x1) > -1 ? 1 : -1;
assert(predict == expected_val);
std::cout << " ...passed" << std::endl;
}
}
/**
* test function to predict points in a 3D coordinate system lying within the
* sphere of radius 1 and centre at origin as +1 and others as -1. Note that
* each point is defined by 3 values but we use 6 features. The function will
* create random sample points for training and test purposes.
* The sphere centred at origin and radius 1 is defined as:
* \f$x^2+y^2+z^2=r^2=1\f$ and if the \f$r^2<1\f$, point lies within the sphere
* else, outside.
*
* \param[in] eta learning rate (optional, default=0.01)
*/
void test3(double eta = 0.01) {
adaline ada(6, eta); // 2 features
const int N = 100; // number of sample points
std::array<std::vector<double>, N> X;
std::array<int, N> Y{}; // corresponding y-values
// generate sample points in the interval
// [-range2/100 , (range2-1)/100]
int range = 200; // sample points full-range
int range2 = range >> 1; // sample points half-range
for (int i = 0; i < N; i++) {
double x0 = (static_cast<double>(std::rand() % range) - range2) / 100.f;
double x1 = (static_cast<double>(std::rand() % range) - range2) / 100.f;
double x2 = (static_cast<double>(std::rand() % range) - range2) / 100.f;
X[i] = std::vector<double>({x0, x1, x2, x0 * x0, x1 * x1, x2 * x2});
Y[i] = ((x0 * x0) + (x1 * x1) + (x2 * x2)) <= 1.f ? 1 : -1;
}
std::cout << "------- Test 3 -------" << std::endl;
std::cout << "Model before fit: " << ada << std::endl;
ada.fit(X, Y);
std::cout << "Model after fit: " << ada << std::endl;
int N_test_cases = 5;
for (int i = 0; i < N_test_cases; i++) {
double x0 = (static_cast<double>(std::rand() % range) - range2) / 100.f;
double x1 = (static_cast<double>(std::rand() % range) - range2) / 100.f;
double x2 = (static_cast<double>(std::rand() % range) - range2) / 100.f;
int predict = ada.predict({x0, x1, x2, x0 * x0, x1 * x1, x2 * x2});
std::cout << "Predict for x=(" << x0 << "," << x1 << "," << x2
<< "): " << predict;
int expected_val = ((x0 * x0) + (x1 * x1) + (x2 * x2)) <= 1.f ? 1 : -1;
assert(predict == expected_val);
std::cout << " ...passed" << std::endl;
}
}
/** Main function */
int main(int argc, char **argv) {
std::srand(std::time(nullptr)); // initialize random number generator
double eta = 0.1; // default value of eta
if (argc == 2) { // read eta value from commandline argument if present
eta = strtof(argv[1], nullptr);
}
test1(eta);
std::cout << "Press ENTER to continue..." << std::endl;
std::cin.get();
test2(eta);
std::cout << "Press ENTER to continue..." << std::endl;
std::cin.get();
test3(eta);
return 0;
}
