Error

You’ve just coded the MCL algorithm, and now you should evaluate the overall quality of your solution. To do so, you’ll need to compute the average distance between the particles and the robot. A good solution will result in an average distance smaller than a meter. Now, use the evaluation function and compute the average distance, or error at each iteration.

Start Quiz:

main.cpp solution.cpp

//#include "src/matplotlibcpp.h"//Graph Library
#include <iostream>
#include <string>
#include <math.h>
#include <vector>
#include <stdexcept> // throw errors
#include <random> //C++ 11 Random Numbers

//namespace plt = matplotlibcpp;
using namespace std;

// Landmarks
double landmarks[8][2] = { { 20.0, 20.0 }, { 20.0, 80.0 }, { 20.0, 50.0 },
    { 50.0, 20.0 }, { 50.0, 80.0 }, { 80.0, 80.0 },
    { 80.0, 20.0 }, { 80.0, 50.0 } };

// Map size in meters
double world_size = 100.0;

// Random Generators
random_device rd;
mt19937 gen(rd());

// Global Functions
double mod(double first_term, double second_term);
double gen_real_random();

class Robot {
public:
    Robot()
    {
        // Constructor
        x = gen_real_random() * world_size; // robot's x coordinate
        y = gen_real_random() * world_size; // robot's y coordinate
        orient = gen_real_random() * 2.0 * M_PI; // robot's orientation

        forward_noise = 0.0; //noise of the forward movement
        turn_noise = 0.0; //noise of the turn
        sense_noise = 0.0; //noise of the sensing
    }

    void set(double new_x, double new_y, double new_orient)
    {
        // Set robot new position and orientation
        if (new_x < 0 || new_x >= world_size)
            throw std::invalid_argument("X coordinate out of bound");
        if (new_y < 0 || new_y >= world_size)
            throw std::invalid_argument("Y coordinate out of bound");
        if (new_orient < 0 || new_orient >= 2 * M_PI)
            throw std::invalid_argument("Orientation must be in [0..2pi]");

        x = new_x;
        y = new_y;
        orient = new_orient;
    }

    void set_noise(double new_forward_noise, double new_turn_noise, double new_sense_noise)
    {
        // Simulate noise, often useful in particle filters
        forward_noise = new_forward_noise;
        turn_noise = new_turn_noise;
        sense_noise = new_sense_noise;
    }

    vector<double> sense()
    {
        // Measure the distances from the robot toward the landmarks
        vector<double> z(sizeof(landmarks) / sizeof(landmarks[0]));
        double dist;

        for (int i = 0; i < sizeof(landmarks) / sizeof(landmarks[0]); i++) {
            dist = sqrt(pow((x - landmarks[i][0]), 2) + pow((y - landmarks[i][1]), 2));
            dist += gen_gauss_random(0.0, sense_noise);
            z[i] = dist;
        }
        return z;
    }

    Robot move(double turn, double forward)
    {
        if (forward < 0)
            throw std::invalid_argument("Robot cannot move backward");

        // turn, and add randomness to the turning command
        orient = orient + turn + gen_gauss_random(0.0, turn_noise);
        orient = mod(orient, 2 * M_PI);

        // move, and add randomness to the motion command
        double dist = forward + gen_gauss_random(0.0, forward_noise);
        x = x + (cos(orient) * dist);
        y = y + (sin(orient) * dist);

        // cyclic truncate
        x = mod(x, world_size);
        y = mod(y, world_size);

        // set particle
        Robot res;
        res.set(x, y, orient);
        res.set_noise(forward_noise, turn_noise, sense_noise);

        return res;
    }

    string show_pose()
    {
        // Returns the robot current position and orientation in a string format
        return "[x=" + to_string(x) + " y=" + to_string(y) + " orient=" + to_string(orient) + "]";
    }

    string read_sensors()
    {
        // Returns all the distances from the robot toward the landmarks
        vector<double> z = sense();
        string readings = "[";
        for (int i = 0; i < z.size(); i++) {
            readings += to_string(z[i]) + " ";
        }
        readings[readings.size() - 1] = ']';

        return readings;
    }

    double measurement_prob(vector<double> measurement)
    {
        // Calculates how likely a measurement should be
        double prob = 1.0;
        double dist;

        for (int i = 0; i < sizeof(landmarks) / sizeof(landmarks[0]); i++) {
            dist = sqrt(pow((x - landmarks[i][0]), 2) + pow((y - landmarks[i][1]), 2));
            prob *= gaussian(dist, sense_noise, measurement[i]);
        }

        return prob;
    }

    double x, y, orient; //robot poses
    double forward_noise, turn_noise, sense_noise; //robot noises

private:
    double gen_gauss_random(double mean, double variance)
    {
        // Gaussian random
        normal_distribution<double> gauss_dist(mean, variance);
        return gauss_dist(gen);
    }

    double gaussian(double mu, double sigma, double x)
    {
        // Probability of x for 1-dim Gaussian with mean mu and var. sigma
        return exp(-(pow((mu - x), 2)) / (pow(sigma, 2)) / 2.0) / sqrt(2.0 * M_PI * (pow(sigma, 2)));
    }
};

// Functions
double gen_real_random()
{
    // Generate real random between 0 and 1
    uniform_real_distribution<double> real_dist(0.0, 1.0); //Real
    return real_dist(gen);
}

double mod(double first_term, double second_term)
{
    // Compute the modulus
    return first_term - (second_term)*floor(first_term / (second_term));
}

double evaluation(Robot r, Robot p[], int n)
{
    //Calculate the mean error of the system
    double sum = 0.0;
    for (int i = 0; i < n; i++) {
        //the second part is because of world's cyclicity
        double dx = mod((p[i].x - r.x + (world_size / 2.0)), world_size) - (world_size / 2.0);
        double dy = mod((p[i].y - r.y + (world_size / 2.0)), world_size) - (world_size / 2.0);
        double err = sqrt(pow(dx, 2) + pow(dy, 2));
        sum += err;
    }
    return sum / n;
}
double max(double arr[], int n)
{
    // Identify the max element in an array
    double max = 0;
    for (int i = 0; i < n; i++) {
        if (arr[i] > max)
            max = arr[i];
    }
    return max;
}
/*
void visualization(int n, Robot robot, int step, Robot p[], Robot pr[])
{
	//Draw the robot, landmarks, particles and resampled particles on a graph
	
    //Graph Format
    plt::title("MCL, step " + to_string(step));
    plt::xlim(0, 100);
    plt::ylim(0, 100);

    //Draw particles in green
    for (int i = 0; i < n; i++) {
        plt::plot({ p[i].x }, { p[i].y }, "go");
    }

    //Draw resampled particles in yellow
    for (int i = 0; i < n; i++) {
        plt::plot({ pr[i].x }, { pr[i].y }, "yo");
    }

    //Draw landmarks in red
    for (int i = 0; i < sizeof(landmarks) / sizeof(landmarks[0]); i++) {
        plt::plot({ landmarks[i][0] }, { landmarks[i][1] }, "ro");
    }
    
    //Draw robot position in blue
    plt::plot({ robot.x }, { robot.y }, "bo");

	//Save the image and close the plot
    plt::save("./Images/Step" + to_string(step) + ".png");
    plt::clf();
}
*/

int main()
{
    //Practice Interfacing with Robot Class
    Robot myrobot;
    myrobot.set_noise(5.0, 0.1, 5.0);
    myrobot.set(30.0, 50.0, M_PI / 2.0);
    myrobot.move(-M_PI / 2.0, 15.0);
    //cout << myrobot.read_sensors() << endl;
    myrobot.move(-M_PI / 2.0, 10.0);
    //cout << myrobot.read_sensors() << endl;

    // Create a set of particles
    int n = 1000;
    Robot p[n];

    for (int i = 0; i < n; i++) {
        p[i].set_noise(0.05, 0.05, 5.0);
        //cout << p[i].show_pose() << endl;
    }

    //Re-initialize myrobot object and Initialize a measurment vector
    myrobot = Robot();
    vector<double> z;

    //Iterating 50 times over the set of particles
    int steps = 50;
    for (int t = 0; t < steps; t++) {

        //Move the robot and sense the environment afterwards
        myrobot = myrobot.move(0.1, 5.0);
        z = myrobot.sense();

        // Simulate a robot motion for each of these particles
        Robot p2[n];
        for (int i = 0; i < n; i++) {
            p2[i] = p[i].move(0.1, 5.0);
            p[i] = p2[i];
        }

        //Generate particle weights depending on robot's measurement
        double w[n];
        for (int i = 0; i < n; i++) {
            w[i] = p[i].measurement_prob(z);
            //cout << w[i] << endl;
        }

        //Resample the particles with a sample probability proportional to the importance weight
        Robot p3[n];
        int index = gen_real_random() * n;
        //cout << index << endl;
        double beta = 0.0;
        double mw = max(w, n);
        //cout << mw;
        for (int i = 0; i < n; i++) {
            beta += gen_real_random() * 2.0 * mw;
            while (beta > w[index]) {
                beta -= w[index];
                index = mod((index + 1), n);
            }
            p3[i] = p[index];
        }
        for (int k=0; k < n; k++) {
            p[k] = p3[k];
            //cout << p[k].show_pose() << endl;
        }

        //####   DON'T MODIFY ANYTHING ABOVE HERE! ENTER CODE BELOW ####
        
        // TODO: Evaluate the error by priting it in this form:
        // cout << "Step = " << t << ", Evaluation = " << ErrorValue << endl;


    } //End of Steps loop
    return 0;
}

//#include "src/matplotlibcpp.h"//Graph Library
#include <iostream>
#include <string>
#include <math.h>
#include <vector>
#include <stdexcept> // throw errors
#include <random> //C++ 11 Random Numbers

//namespace plt = matplotlibcpp;
using namespace std;

// Landmarks
double landmarks[8][2] = { { 20.0, 20.0 }, { 20.0, 80.0 }, { 20.0, 50.0 },
    { 50.0, 20.0 }, { 50.0, 80.0 }, { 80.0, 80.0 },
    { 80.0, 20.0 }, { 80.0, 50.0 } };

// Map size in meters
double world_size = 100.0;

// Random Generators
random_device rd;
mt19937 gen(rd());

// Global Functions
double mod(double first_term, double second_term);
double gen_real_random();

class Robot {
public:
    Robot()
    {
        // Constructor
        x = gen_real_random() * world_size; // robot's x coordinate
        y = gen_real_random() * world_size; // robot's y coordinate
        orient = gen_real_random() * 2.0 * M_PI; // robot's orientation

        forward_noise = 0.0; //noise of the forward movement
        turn_noise = 0.0; //noise of the turn
        sense_noise = 0.0; //noise of the sensing
    }

    void set(double new_x, double new_y, double new_orient)
    {
        // Set robot new position and orientation
        if (new_x < 0 || new_x >= world_size)
            throw std::invalid_argument("X coordinate out of bound");
        if (new_y < 0 || new_y >= world_size)
            throw std::invalid_argument("Y coordinate out of bound");
        if (new_orient < 0 || new_orient >= 2 * M_PI)
            throw std::invalid_argument("Orientation must be in [0..2pi]");

        x = new_x;
        y = new_y;
        orient = new_orient;
    }

    void set_noise(double new_forward_noise, double new_turn_noise, double new_sense_noise)
    {
        // Simulate noise, often useful in particle filters
        forward_noise = new_forward_noise;
        turn_noise = new_turn_noise;
        sense_noise = new_sense_noise;
    }

    vector<double> sense()
    {
        // Measure the distances from the robot toward the landmarks
        vector<double> z(sizeof(landmarks) / sizeof(landmarks[0]));
        double dist;

        for (int i = 0; i < sizeof(landmarks) / sizeof(landmarks[0]); i++) {
            dist = sqrt(pow((x - landmarks[i][0]), 2) + pow((y - landmarks[i][1]), 2));
            dist += gen_gauss_random(0.0, sense_noise);
            z[i] = dist;
        }
        return z;
    }

    Robot move(double turn, double forward)
    {
        if (forward < 0)
            throw std::invalid_argument("Robot cannot move backward");

        // turn, and add randomness to the turning command
        orient = orient + turn + gen_gauss_random(0.0, turn_noise);
        orient = mod(orient, 2 * M_PI);

        // move, and add randomness to the motion command
        double dist = forward + gen_gauss_random(0.0, forward_noise);
        x = x + (cos(orient) * dist);
        y = y + (sin(orient) * dist);

        // cyclic truncate
        x = mod(x, world_size);
        y = mod(y, world_size);

        // set particle
        Robot res;
        res.set(x, y, orient);
        res.set_noise(forward_noise, turn_noise, sense_noise);

        return res;
    }

    string show_pose()
    {
        // Returns the robot current position and orientation in a string format
        return "[x=" + to_string(x) + " y=" + to_string(y) + " orient=" + to_string(orient) + "]";
    }

    string read_sensors()
    {
        // Returns all the distances from the robot toward the landmarks
        vector<double> z = sense();
        string readings = "[";
        for (int i = 0; i < z.size(); i++) {
            readings += to_string(z[i]) + " ";
        }
        readings[readings.size() - 1] = ']';

        return readings;
    }

    double measurement_prob(vector<double> measurement)
    {
        // Calculates how likely a measurement should be
        double prob = 1.0;
        double dist;

        for (int i = 0; i < sizeof(landmarks) / sizeof(landmarks[0]); i++) {
            dist = sqrt(pow((x - landmarks[i][0]), 2) + pow((y - landmarks[i][1]), 2));
            prob *= gaussian(dist, sense_noise, measurement[i]);
        }

        return prob;
    }

    double x, y, orient; //robot poses
    double forward_noise, turn_noise, sense_noise; //robot noises

private:
    double gen_gauss_random(double mean, double variance)
    {
        // Gaussian random
        normal_distribution<double> gauss_dist(mean, variance);
        return gauss_dist(gen);
    }

    double gaussian(double mu, double sigma, double x)
    {
        // Probability of x for 1-dim Gaussian with mean mu and var. sigma
        return exp(-(pow((mu - x), 2)) / (pow(sigma, 2)) / 2.0) / sqrt(2.0 * M_PI * (pow(sigma, 2)));
    }
};

// Functions
double gen_real_random()
{
    // Generate real random between 0 and 1
    uniform_real_distribution<double> real_dist(0.0, 1.0); //Real
    return real_dist(gen);
}

double mod(double first_term, double second_term)
{
    // Compute the modulus
    return first_term - (second_term)*floor(first_term / (second_term));
}

double evaluation(Robot r, Robot p[], int n)
{
    //Calculate the mean error of the system
    double sum = 0.0;
    for (int i = 0; i < n; i++) {
        //the second part is because of world's cyclicity
        double dx = mod((p[i].x - r.x + (world_size / 2.0)), world_size) - (world_size / 2.0);
        double dy = mod((p[i].y - r.y + (world_size / 2.0)), world_size) - (world_size / 2.0);
        double err = sqrt(pow(dx, 2) + pow(dy, 2));
        sum += err;
    }
    return sum / n;
}
double max(double arr[], int n)
{
    // Identify the max element in an array
    double max = 0;
    for (int i = 0; i < n; i++) {
        if (arr[i] > max)
            max = arr[i];
    }
    return max;
}
/*
void visualization(int n, Robot robot, int step, Robot p[], Robot pr[])
{
	//Draw the robot, landmarks, particles and resampled particles on a graph
	
    //Graph Format
    plt::title("MCL, step " + to_string(step));
    plt::xlim(0, 100);
    plt::ylim(0, 100);

    //Draw particles in green
    for (int i = 0; i < n; i++) {
        plt::plot({ p[i].x }, { p[i].y }, "go");
    }

    //Draw resampled particles in yellow
    for (int i = 0; i < n; i++) {
        plt::plot({ pr[i].x }, { pr[i].y }, "yo");
    }

    //Draw landmarks in red
    for (int i = 0; i < sizeof(landmarks) / sizeof(landmarks[0]); i++) {
        plt::plot({ landmarks[i][0] }, { landmarks[i][1] }, "ro");
    }
    
    //Draw robot position in blue
    plt::plot({ robot.x }, { robot.y }, "bo");

	//Save the image and close the plot
    plt::save("./Images/Step" + to_string(step) + ".png");
    plt::clf();
}
*/

int main()
{
    //Practice Interfacing with Robot Class
    Robot myrobot;
    myrobot.set_noise(5.0, 0.1, 5.0);
    myrobot.set(30.0, 50.0, M_PI / 2.0);
    myrobot.move(-M_PI / 2.0, 15.0);
    //cout << myrobot.read_sensors() << endl;
    myrobot.move(-M_PI / 2.0, 10.0);
    //cout << myrobot.read_sensors() << endl;

    // Create a set of particles
    int n = 1000;
    Robot p[n];

    for (int i = 0; i < n; i++) {
        p[i].set_noise(0.05, 0.05, 5.0);
        //cout << p[i].show_pose() << endl;
    }

    //Re-initialize myrobot object and Initialize a measurment vector
    myrobot = Robot();
     vector<double> z;

    //Iterating 50 times over the set of particles
    int steps = 50;
    for (int t = 0; t < steps; t++) {

        //Move the robot and sense the environment afterwards
        myrobot = myrobot.move(0.1, 5.0);
        z = myrobot.sense();

        // Simulate a robot motion for each of these particles
        Robot p2[n];
        for (int i = 0; i < n; i++) {
            p2[i] = p[i].move(0.1, 5.0);
            p[i] = p2[i];
        }

        //Generate particle weights depending on robot's measurement
        double w[n];
        for (int i = 0; i < n; i++) {
            w[i] = p[i].measurement_prob(z);
            //cout << w[i] << endl;
        }

        //Resample the particles with a sample probability proportional to the importance weight
        Robot p3[n];
        int index = gen_real_random() * n;
        //cout << index << endl;
        double beta = 0.0;
        double mw = max(w, n);
        //cout << mw;
        for (int i = 0; i < n; i++) {
            beta += gen_real_random() * 2.0 * mw;
            while (beta > w[index]) {
                beta -= w[index];
                index = mod((index + 1), n);
            }
            p3[i] = p[index];
        }
        for (int k=0; k < n; k++) {
            p[k] = p3[k];
            //cout << p[k].show_pose() << endl;
        }

        //####   DON'T MODIFY ANYTHING ABOVE HERE! ENTER CODE BELOW ####
        
        //Evaluate the error by priting it in this form:
        // cout << "Step = " << t << ", Evaluation = " << ErrorValue << endl;
        cout << "Step = " << t << ", Evaluation = " << evaluation(myrobot, p, n) << endl;

    } //End of Steps loop
    return 0;
}

Each number generated denotes the average distance between the particles and the robot in a world of 100mx100m. Notice how the number starts relatively high and converges to a smaller number after several iterations.

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