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* feat: Add ncr mod p code (#1323) * Update math/ncr_modulo_p.cpp Co-authored-by: David Leal <halfpacho@gmail.com> * Added all functions inside a class + added more asserts * updating DIRECTORY.md * clang-format and clang-tidy fixes forf6df24a5* Replace int64_t to uint64_t + add namespace + detailed documentation * clang-format and clang-tidy fixes fore09a0579* Add extra namespace + add const& in function arguments * clang-format and clang-tidy fixes for8111f881* Update ncr_modulo_p.cpp * clang-format and clang-tidy fixes for2ad2f721* Update math/ncr_modulo_p.cpp Co-authored-by: David Leal <halfpacho@gmail.com> * Update math/ncr_modulo_p.cpp Co-authored-by: David Leal <halfpacho@gmail.com> * Update math/ncr_modulo_p.cpp Co-authored-by: David Leal <halfpacho@gmail.com> * clang-format and clang-tidy fixes for5b69ba5c* updating DIRECTORY.md * clang-format and clang-tidy fixes fora8401d4bCo-authored-by: David Leal <halfpacho@gmail.com> Co-authored-by: github-actions <${GITHUB_ACTOR}@users.noreply.github.com>
134 lines
4.0 KiB
C++
134 lines
4.0 KiB
C++
/**
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* @{
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* \file
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* \brief [Runge Kutta fourth
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* order](https://en.wikipedia.org/wiki/Runge%E2%80%93Kutta_methods) method
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* implementation
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*
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* \author [Rudra Prasad Das](http://github.com/rudra697)
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*
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* \details
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* It solves the unknown value of y
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* for a given value of x
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* only first order differential equations
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* can be solved
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* \example
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* it solves \frac{\mathrm{d} y}{\mathrm{d} x}= \frac{\left ( x-y \right )}{2}
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* given x for given initial
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* conditions
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* There can be many such equations
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*/
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#include <cassert> /// asserting the test functions
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#include <iostream> /// for io operations
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#include <vector> /// for using the vector container
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/**
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* @brief The change() function is used
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* to return the updated iterative value corresponding
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* to the given function
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* @param x is the value corresponding to the x coordinate
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* @param y is the value corresponding to the y coordinate
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* @returns the computed function value at that call
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*/
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static double change(double x, double y) { return ((x - y) / 2.0); }
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/**
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* @namespace numerical_methods
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* @brief Numerical Methods
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*/
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namespace numerical_methods {
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/**
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* @namespace runge_kutta
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* @brief Functions for [Runge Kutta fourth
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* order](https://en.wikipedia.org/wiki/Runge%E2%80%93Kutta_methods) method
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*/
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namespace runge_kutta {
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/**
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* @brief the Runge Kutta method finds the value of integration of a function in
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* the given limits. the lower limit of integration as the initial value and the
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* upper limit is the given x
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* @param init_x is the value of initial x and is updated after each call
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* @param init_y is the value of initial x and is updated after each call
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* @param x is current iteration at which the function needs to be evaluated
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* @param h is the step value
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* @returns the value of y at thr required value of x from the initial
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* conditions
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*/
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double rungeKutta(double init_x, const double &init_y, const double &x,
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const double &h) {
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// Count number of iterations
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// using step size or
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// step height h
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// n calucates the number of iterations
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// k1, k2, k3, k4 are the Runge Kutta variables
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// used for calculation of y at each iteration
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auto n = static_cast<uint64_t>((x - init_x) / h);
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// used a vector container for the variables
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std::vector<double> k(4, 0.0);
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// Iterate for number of iterations
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double y = init_y;
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for (int i = 1; i <= n; ++i) {
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// Apply Runge Kutta Formulas
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// to find next value of y
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k[0] = h * change(init_x, y);
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k[1] = h * change(init_x + 0.5 * h, y + 0.5 * k[0]);
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k[2] = h * change(init_x + 0.5 * h, y + 0.5 * k[1]);
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k[3] = h * change(init_x + h, y + k[2]);
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// Update next value of y
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y += (1.0 / 6.0) * (k[0] + 2 * k[1] + 2 * k[2] + k[3]);
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// Update next value of x
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init_x += h;
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}
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return y;
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}
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} // namespace runge_kutta
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} // namespace numerical_methods
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/**
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* @brief Tests to check algorithm implementation.
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* @returns void
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*/
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static void test() {
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std::cout << "The Runge Kutta function will be tested on the basis of "
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"precomputed values\n";
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std::cout << "Test 1...."
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<< "\n";
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double valfirst = numerical_methods::runge_kutta::rungeKutta(
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2, 3, 4, 0.2); // Tests the function with pre calculated values
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assert(valfirst == 3.10363932323749570);
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std::cout << "Passed Test 1\n";
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std::cout << "Test 2...."
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<< "\n";
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double valsec = numerical_methods::runge_kutta::rungeKutta(
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1, 2, 5, 0.1); // The value of step changed
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assert(valsec == 3.40600589380261409);
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std::cout << "Passed Test 2\n";
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std::cout << "Test 3...."
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<< "\n";
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double valthird = numerical_methods::runge_kutta::rungeKutta(
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-1, 3, 4, 0.1); // Tested with negative value
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assert(valthird == 2.49251005860244268);
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std::cout << "Passed Test 3\n";
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}
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/**
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* @brief Main function
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* @returns 0 on exit
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*/
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int main() {
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test(); // Execute the tests
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return 0;
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}
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