// Copyright Paul A. Bristow 2017 // Copyright John Z. Maddock 2017 // Distributed under the Boost Software License, Version 1.0. // (See accompanying file LICENSE_1_0.txt or // copy at http ://www.boost.org/LICENSE_1_0.txt). /*! \brief Graph showing use of Lambert W function. \details Both Lambert W0 and W-1 branches can be shown on one graph. But useful to have another graph for larger values of argument z. Need two separate graphs for Lambert W0 and -1 prime because the sensible ranges and axes are too different. One would get too small LambertW0 in top right and W-1 in bottom left. */ #include using boost::math::lambert_w0; using boost::math::lambert_wm1; using boost::math::lambert_w0_prime; using boost::math::lambert_wm1_prime; #include using boost::math::isfinite; #include using namespace boost::svg; #include using boost::svg::show_2d_plot_settings; #include // using std::cout; // using std::endl; #include #include #include #include #include #include using std::pair; #include using std::map; #include using std::multiset; #include using std::numeric_limits; #include // /*! */ int main() { try { std::cout << "Lambert W graph example." << std::endl; //[lambert_w_graph_1 //] [/lambert_w_graph_1] { std::map wm1s; // Lambert W-1 branch values. std::map w0s; // Lambert W0 branch values. std::cout.precision(std::numeric_limits::max_digits10); int count = 0; for (double z = -0.36787944117144232159552377016146086744581113103176804; z < 2.8; z += 0.001) { double w0 = lambert_w0(z); w0s[z] = w0; // std::cout << "z " << z << ", w = " << w0 << std::endl; count++; } std::cout << "points " << count << std::endl; count = 0; for (double z = -0.3678794411714423215955237701614608727; z < -0.001; z += 0.001) { double wm1 = lambert_wm1(z); wm1s[z] = wm1; count++; } std::cout << "points " << count << std::endl; svg_2d_plot data_plot; data_plot.title("Lambert W function.") .x_size(400) .y_size(300) .legend_on(true) .legend_lines(true) .x_label("z") .y_label("W") .x_range(-1, 3.) .y_range(-4., +1.) .x_major_interval(1.) .y_major_interval(1.) .x_major_grid_on(true) .y_major_grid_on(true) //.x_values_on(true) //.y_values_on(true) .y_values_rotation(horizontal) //.plot_window_on(true) .x_values_precision(3) .y_values_precision(3) .coord_precision(4) // Needed to avoid stepping on curves. .copyright_holder("Paul A. Bristow") .copyright_date("2018") //.background_border_color(black); ; data_plot.plot(w0s, "W0 branch").line_color(red).shape(none).line_on(true).bezier_on(false).line_width(1); data_plot.plot(wm1s, "W-1 branch").line_color(blue).shape(none).line_on(true).bezier_on(false).line_width(1); data_plot.write("./lambert_w_graph"); show_2d_plot_settings(data_plot); // For plot diagnosis only. } // small z Lambert W { // bigger argument z Lambert W std::map w0s_big; // Lambert W0 branch values for large z and W. std::map wm1s_big; // Lambert W-1 branch values for small z and large -W. int count = 0; for (double z = -0.3678794411714423215955237701614608727; z < 10000.; z += 50.) { double w0 = lambert_w0(z); w0s_big[z] = w0; count++; } std::cout << "points " << count << std::endl; count = 0; for (double z = -0.3678794411714423215955237701614608727; z < -0.001; z += 0.001) { double wm1 = lambert_wm1(z); wm1s_big[z] = wm1; count++; } std::cout << "Lambert W0 large z argument points = " << count << std::endl; svg_2d_plot data_plot2; data_plot2.title("Lambert W0 function for larger z.") .x_size(400) .y_size(300) .legend_on(false) .x_label("z") .y_label("W") //.x_label_on(true) //.y_label_on(true) //.xy_values_on(false) .x_range(-1, 10000.) .y_range(-1., +8.) .x_major_interval(2000.) .y_major_interval(1.) .x_major_grid_on(true) .y_major_grid_on(true) //.x_values_on(true) //.y_values_on(true) .y_values_rotation(horizontal) //.plot_window_on(true) .x_values_precision(3) .y_values_precision(3) .coord_precision(4) // Needed to avoid stepping on curves. .copyright_holder("Paul A. Bristow") .copyright_date("2018") //.background_border_color(black); ; data_plot2.plot(w0s_big, "W0 branch").line_color(red).shape(none).line_on(true).bezier_on(false).line_width(1); // data_plot2.plot(wm1s_big, "W-1 branch").line_color(blue).shape(none).line_on(true).bezier_on(false).line_width(1); // This wouldn't show anything useful. data_plot2.write("./lambert_w_graph_big_w"); } // Big argument z Lambert W { // Lambert W0 Derivative plots // std::map wm1ps; // Lambert W-1 prime branch values. std::map w0ps; // Lambert W0 prime branch values. std::cout.precision(std::numeric_limits::max_digits10); int count = 0; for (double z = -0.36; z < 3.; z += 0.001) { double w0p = lambert_w0_prime(z); w0ps[z] = w0p; // std::cout << "z " << z << ", w0 = " << w0 << std::endl; count++; } std::cout << "points " << count << std::endl; //count = 0; //for (double z = -0.36; z < -0.1; z += 0.001) //{ // double wm1p = lambert_wm1_prime(z); // std::cout << "z " << z << ", w-1 = " << wm1p << std::endl; // wm1ps[z] = wm1p; // count++; //} //std::cout << "points " << count << std::endl; svg_2d_plot data_plotp; data_plotp.title("Lambert W0 prime function.") .x_size(400) .y_size(300) .legend_on(false) .x_label("z") .y_label("W0'") .x_range(-0.3, +1.) .y_range(0., +5.) .x_major_interval(0.2) .y_major_interval(2.) .x_major_grid_on(true) .y_major_grid_on(true) .y_values_rotation(horizontal) .x_values_precision(3) .y_values_precision(3) .coord_precision(4) // Needed to avoid stepping on curves. .copyright_holder("Paul A. Bristow") .copyright_date("2018") ; // derivative of N[productlog(0, x), 55] at x=0 to 10 // Plot[D[N[ProductLog[0, x], 55], x], {x, 0, 10}] // Plot[ProductLog[x]/(x + x ProductLog[x]), {x, 0, 10}] data_plotp.plot(w0ps, "W0 prime branch").line_color(red).shape(none).line_on(true).bezier_on(false).line_width(1); data_plotp.write("./lambert_w0_prime_graph"); } // Lambert W0 Derivative plots { // Lambert Wm1 Derivative plots std::map wm1ps; // Lambert W-1 prime branch values. std::cout.precision(std::numeric_limits::max_digits10); int count = 0; for (double z = -0.3678; z < -0.00001; z += 0.001) { double wm1p = lambert_wm1_prime(z); // std::cout << "z " << z << ", w-1 = " << wm1p << std::endl; wm1ps[z] = wm1p; count++; } std::cout << "Lambert W-1 prime points = " << count << std::endl; svg_2d_plot data_plotp; data_plotp.title("Lambert W-1 prime function.") .x_size(400) .y_size(300) .legend_on(false) .x_label("z") .y_label("W-1'") .x_range(-0.4, +0.01) .x_major_interval(0.1) .y_range(-20., -5.) .y_major_interval(5.) .x_major_grid_on(true) .y_major_grid_on(true) .y_values_rotation(horizontal) .x_values_precision(3) .y_values_precision(3) .coord_precision(4) // Needed to avoid stepping on curves. .copyright_holder("Paul A. Bristow") .copyright_date("2018") ; // derivative of N[productlog(0, x), 55] at x=0 to 10 // Plot[D[N[ProductLog[0, x], 55], x], {x, 0, 10}] // Plot[ProductLog[x]/(x + x ProductLog[x]), {x, 0, 10}] data_plotp.plot(wm1ps, "W-1 prime branch").line_color(blue).shape(none).line_on(true).bezier_on(false).line_width(1); data_plotp.write("./lambert_wm1_prime_graph"); } // Lambert W-1 prime graph } // try catch (std::exception& ex) { std::cout << ex.what() << std::endl; } } // int main() /* //[lambert_w_graph_1_output //] [/lambert_w_graph_1_output] */