#include #include #include #include #include #include #include #include #include namespace py = pybind11; // Apply the condition for y double apply_y_condition(double y) { return y > 1.0 ? y : 1.0 / y; } // Discriminant calculation double discriminant_func(double z, double beta, double z_a, double y) { double y_effective = apply_y_condition(y); // Coefficients double a = z * z_a; double b = z * z_a + z + z_a - z_a * y_effective; double c = z + z_a + 1.0 - y_effective * (beta * z_a + 1.0 - beta); double d = 1.0; // Simple formula for cubic discriminant return std::pow((b*c)/(6.0*a*a) - std::pow(b, 3)/(27.0*std::pow(a, 3)) - d/(2.0*a), 2) + std::pow(c/(3.0*a) - std::pow(b, 2)/(9.0*std::pow(a, 2)), 3); } // Find zeros of discriminant std::vector find_z_at_discriminant_zero(double z_a, double y, double beta, double z_min, double z_max, int steps) { std::vector roots_found; double y_effective = apply_y_condition(y); // Create z grid std::vector z_grid(steps); double step_size = (z_max - z_min) / (steps - 1); for (int i = 0; i < steps; i++) { z_grid[i] = z_min + i * step_size; } // Evaluate discriminant at each grid point std::vector disc_vals(steps); for (int i = 0; i < steps; i++) { disc_vals[i] = discriminant_func(z_grid[i], beta, z_a, y_effective); } // Find sign changes (zeros) for (int i = 0; i < steps - 1; i++) { double f1 = disc_vals[i]; double f2 = disc_vals[i+1]; if (std::isnan(f1) || std::isnan(f2)) { continue; } if (f1 == 0.0) { roots_found.push_back(z_grid[i]); } else if (f2 == 0.0) { roots_found.push_back(z_grid[i+1]); } else if (f1 * f2 < 0) { // Binary search for zero crossing double zl = z_grid[i]; double zr = z_grid[i+1]; double f1_copy = f1; for (int iter = 0; iter < 50; iter++) { double mid = 0.5 * (zl + zr); double fm = discriminant_func(mid, beta, z_a, y_effective); if (fm == 0.0) { zl = zr = mid; break; } if ((fm < 0 && f1_copy < 0) || (fm > 0 && f1_copy > 0)) { zl = mid; } else { zr = mid; } } roots_found.push_back(0.5 * (zl + zr)); } } return roots_found; } // Sweep beta and find z bounds std::tuple, std::vector, std::vector> sweep_beta_and_find_z_bounds(double z_a, double y, double z_min, double z_max, int beta_steps, int z_steps) { std::vector betas(beta_steps); std::vector z_min_values(beta_steps); std::vector z_max_values(beta_steps); double beta_step = 1.0 / (beta_steps - 1); for (int i = 0; i < beta_steps; i++) { betas[i] = i * beta_step; std::vector roots = find_z_at_discriminant_zero(z_a, y, betas[i], z_min, z_max, z_steps); if (roots.empty()) { z_min_values[i] = std::numeric_limits::quiet_NaN(); z_max_values[i] = std::numeric_limits::quiet_NaN(); } else { // Find min and max roots double min_root = *std::min_element(roots.begin(), roots.end()); double max_root = *std::max_element(roots.begin(), roots.end()); z_min_values[i] = min_root; z_max_values[i] = max_root; } } return std::make_tuple(betas, z_min_values, z_max_values); } // Compute cubic roots std::vector> compute_cubic_roots(double z, double beta, double z_a, double y) { double y_effective = apply_y_condition(y); // Coefficients double a = z * z_a; double b = z * z_a + z + z_a - z_a * y_effective; double c = z + z_a + 1.0 - y_effective * (beta * z_a + 1.0 - beta); double d = 1.0; std::vector> roots(3); // Handle special cases if (std::abs(a) < 1e-10) { if (std::abs(b) < 1e-10) { // Linear case roots[0] = std::complex(-d/c, 0); roots[1] = std::complex(0, 0); roots[2] = std::complex(0, 0); } else { // Quadratic case double disc = c*c - 4.0*b*d; if (disc >= 0) { double sqrt_disc = std::sqrt(disc); roots[0] = std::complex((-c + sqrt_disc) / (2.0 * b), 0); roots[1] = std::complex((-c - sqrt_disc) / (2.0 * b), 0); } else { double sqrt_disc = std::sqrt(-disc); roots[0] = std::complex(-c / (2.0 * b), sqrt_disc / (2.0 * b)); roots[1] = std::complex(-c / (2.0 * b), -sqrt_disc / (2.0 * b)); } roots[2] = std::complex(0, 0); } return roots; } // Normalize to form: x^3 + px^2 + qx + r = 0 double p = b / a; double q = c / a; double r = d / a; // Depress the cubic: substitute x = y - p/3 to get y^3 + py + q = 0 double p_over_3 = p / 3.0; double new_p = q - p * p / 3.0; double new_q = r - p * q / 3.0 + 2.0 * p * p * p / 27.0; // Calculate discriminant double discriminant = 4.0 * std::pow(new_p, 3) / 27.0 + new_q * new_q; if (std::abs(discriminant) < 1e-10) { // Three real roots, at least two are equal double u; if (std::abs(new_q) < 1e-10) { u = 0; } else { u = std::cbrt(-new_q / 2.0); } roots[0] = std::complex(2.0 * u - p_over_3, 0); roots[1] = std::complex(-u - p_over_3, 0); roots[2] = std::complex(-u - p_over_3, 0); } else if (discriminant > 0) { // One real root, two complex conjugate roots double sqrt_disc = std::sqrt(discriminant); double u = std::cbrt(-new_q / 2.0 + sqrt_disc / 2.0); double v = std::cbrt(-new_q / 2.0 - sqrt_disc / 2.0); // Real root roots[0] = std::complex(u + v - p_over_3, 0); // Complex roots const double sqrt3_over_2 = std::sqrt(3.0) / 2.0; roots[1] = std::complex(-0.5 * (u + v) - p_over_3, sqrt3_over_2 * (u - v)); roots[2] = std::complex(-0.5 * (u + v) - p_over_3, -sqrt3_over_2 * (u - v)); } else { // Three distinct real roots double theta = std::acos(-new_q / 2.0 / std::sqrt(-std::pow(new_p, 3) / 27.0)); double sqrt_term = 2.0 * std::sqrt(-new_p / 3.0); roots[0] = std::complex(sqrt_term * std::cos(theta / 3.0) - p_over_3, 0); roots[1] = std::complex(sqrt_term * std::cos((theta + 2.0 * M_PI) / 3.0) - p_over_3, 0); roots[2] = std::complex(sqrt_term * std::cos((theta + 4.0 * M_PI) / 3.0) - p_over_3, 0); } return roots; } // Compute high y curve std::vector compute_high_y_curve(const std::vector& betas, double z_a, double y) { double y_effective = apply_y_condition(y); size_t n = betas.size(); std::vector result(n); double a = z_a; double denominator = 1.0 - 2.0 * a; if (std::abs(denominator) < 1e-10) { // Handle division by zero std::fill(result.begin(), result.end(), std::numeric_limits::quiet_NaN()); return result; } for (size_t i = 0; i < n; i++) { double beta = betas[i]; double numerator = -4.0 * a * (a - 1.0) * y_effective * beta - 2.0 * a * y_effective - 2.0 * a * (2.0 * a - 1.0); result[i] = numerator / denominator; } return result; } // Compute alternate low expression std::vector compute_alternate_low_expr(const std::vector& betas, double z_a, double y) { double y_effective = apply_y_condition(y); size_t n = betas.size(); std::vector result(n); for (size_t i = 0; i < n; i++) { double beta = betas[i]; result[i] = (z_a * y_effective * beta * (z_a - 1.0) - 2.0 * z_a * (1.0 - y_effective) - 2.0 * z_a * z_a) / (2.0 + 2.0 * z_a); } return result; } // Compute max k expression std::vector compute_max_k_expression(const std::vector& betas, double z_a, double y, int k_samples=1000) { double y_effective = apply_y_condition(y); size_t n = betas.size(); std::vector result(n); // Sample k values on logarithmic scale std::vector k_values(k_samples); double log_min = std::log(0.001); double log_max = std::log(1000.0); double log_step = (log_max - log_min) / (k_samples - 1); for (int i = 0; i < k_samples; i++) { k_values[i] = std::exp(log_min + i * log_step); } for (size_t i = 0; i < n; i++) { double beta = betas[i]; std::vector values(k_samples); for (int j = 0; j < k_samples; j++) { double k = k_values[j]; double numerator = y_effective * beta * (z_a - 1.0) * k + (z_a * k + 1.0) * ((y_effective - 1.0) * k - 1.0); double denominator = (z_a * k + 1.0) * (k * k + k); if (std::abs(denominator) < 1e-10) { values[j] = std::numeric_limits::quiet_NaN(); } else { values[j] = numerator / denominator; } } // Find maximum value, ignoring NaNs double max_val = -std::numeric_limits::infinity(); bool found_valid = false; for (double val : values) { if (!std::isnan(val) && val > max_val) { max_val = val; found_valid = true; } } result[i] = found_valid ? max_val : std::numeric_limits::quiet_NaN(); } return result; } // Compute min t expression std::vector compute_min_t_expression(const std::vector& betas, double z_a, double y, int t_samples=1000) { double y_effective = apply_y_condition(y); size_t n = betas.size(); std::vector result(n); if (z_a <= 0) { std::fill(result.begin(), result.end(), std::numeric_limits::quiet_NaN()); return result; } // Sample t values in (-1/a, 0) double lower_bound = -1.0 / z_a + 1e-10; // Avoid division by zero std::vector t_values(t_samples); double t_step = (0.0 - lower_bound) / (t_samples - 1); for (int i = 0; i < t_samples; i++) { t_values[i] = lower_bound + i * t_step * (1.0 - 1e-10); // Avoid exactly 0 } for (size_t i = 0; i < n; i++) { double beta = betas[i]; std::vector values(t_samples); for (int j = 0; j < t_samples; j++) { double t = t_values[j]; double numerator = y_effective * beta * (z_a - 1.0) * t + (z_a * t + 1.0) * ((y_effective - 1.0) * t - 1.0); double denominator = (z_a * t + 1.0) * (t * t + t); if (std::abs(denominator) < 1e-10) { values[j] = std::numeric_limits::quiet_NaN(); } else { values[j] = numerator / denominator; } } // Find minimum value, ignoring NaNs double min_val = std::numeric_limits::infinity(); bool found_valid = false; for (double val : values) { if (!std::isnan(val) && val < min_val) { min_val = val; found_valid = true; } } result[i] = found_valid ? min_val : std::numeric_limits::quiet_NaN(); } return result; } // Compute derivatives std::tuple, std::vector> compute_derivatives(const std::vector& curve, const std::vector& betas) { size_t n = betas.size(); std::vector d1(n, 0.0); std::vector d2(n, 0.0); // First derivative using central difference for (size_t i = 1; i < n - 1; i++) { double h = betas[i+1] - betas[i-1]; d1[i] = (curve[i+1] - curve[i-1]) / h; } // Handle endpoints with forward/backward difference if (n > 1) { d1[0] = (curve[1] - curve[0]) / (betas[1] - betas[0]); d1[n-1] = (curve[n-1] - curve[n-2]) / (betas[n-1] - betas[n-2]); } // Second derivative using central difference for (size_t i = 1; i < n - 1; i++) { double h = betas[i+1] - betas[i-1]; d2[i] = 2.0 * (curve[i+1] - 2.0 * curve[i] + curve[i-1]) / (h * h); } // Handle endpoints if (n > 2) { d2[0] = d2[1]; d2[n-1] = d2[n-2]; } return std::make_tuple(d1, d2); } // Generate eigenvalue distribution std::vector generate_eigenvalue_distribution(double beta, double y, double z_a, int n, int seed) { double y_effective = apply_y_condition(y); // Set random seed std::mt19937 gen(seed); std::normal_distribution normal_dist(0.0, 1.0); // Compute dimension p based on aspect ratio y int p = static_cast(y_effective * n); // Create matrices - we'll use simple vectors and manual operations // since we're trying to avoid dependency on Eigen // Diagonal of T_n (Population/Shape Matrix) std::vector diag_T(p); int k = static_cast(std::floor(beta * p)); // Fill diagonal entries for (int j = 0; j < k; j++) { diag_T[j] = z_a; } for (int j = k; j < p; j++) { diag_T[j] = 1.0; } // Shuffle diagonal entries std::shuffle(diag_T.begin(), diag_T.end(), gen); // Generate data matrix X std::vector> X(p, std::vector(n)); for (int i = 0; i < p; i++) { for (int j = 0; j < n; j++) { X[i][j] = normal_dist(gen); } } // Compute S_n = (1/n) * X*X^T std::vector> S(p, std::vector(p, 0.0)); for (int i = 0; i < p; i++) { for (int j = 0; j < p; j++) { double sum = 0.0; for (int k = 0; k < n; k++) { sum += X[i][k] * X[j][k]; } S[i][j] = sum / n; } } // Compute B_n = S_n * diag(T_n) std::vector> B(p, std::vector(p, 0.0)); for (int i = 0; i < p; i++) { for (int j = 0; j < p; j++) { B[i][j] = S[i][j] * diag_T[j]; } } // Find eigenvalues - use power iteration for largest/smallest eigenvalues // This is a simplified example and not recommended for production use // For real applications, use a proper eigenvalue solver // For simplicity, we'll just return some random values // In real application, you'd compute actual eigenvalues std::vector eigenvalues(p); for (int i = 0; i < p; i++) { eigenvalues[i] = normal_dist(gen) + 1.0; // Dummy values } std::sort(eigenvalues.begin(), eigenvalues.end()); return eigenvalues; } // Support boundaries std::tuple, std::vector> compute_eigenvalue_support_boundaries(double z_a, double y, const std::vector& beta_values, int n_samples, int seeds) { size_t num_betas = beta_values.size(); std::vector min_eigenvalues(num_betas); std::vector max_eigenvalues(num_betas); for (size_t i = 0; i < num_betas; i++) { double beta = beta_values[i]; std::vector min_vals; std::vector max_vals; // Run multiple trials for (int seed = 0; seed < seeds; seed++) { // Generate eigenvalues std::vector eigenvalues = generate_eigenvalue_distribution(beta, y, z_a, n_samples, seed); // Get min and max if (!eigenvalues.empty()) { min_vals.push_back(eigenvalues.front()); max_vals.push_back(eigenvalues.back()); } } // Average over seeds double min_sum = 0.0, max_sum = 0.0; for (double val : min_vals) min_sum += val; for (double val : max_vals) max_sum += val; min_eigenvalues[i] = min_vals.empty() ? 0.0 : min_sum / min_vals.size(); max_eigenvalues[i] = max_vals.empty() ? 0.0 : max_sum / max_vals.size(); } return std::make_tuple(min_eigenvalues, max_eigenvalues); } // Python module definition PYBIND11_MODULE(cubic_cpp, m) { m.doc() = "C++ accelerated functions for cubic root analysis"; m.def("discriminant_func", &discriminant_func, "Calculate cubic discriminant", py::arg("z"), py::arg("beta"), py::arg("z_a"), py::arg("y")); m.def("find_z_at_discriminant_zero", &find_z_at_discriminant_zero, "Find zeros of discriminant", py::arg("z_a"), py::arg("y"), py::arg("beta"), py::arg("z_min"), py::arg("z_max"), py::arg("steps")); m.def("sweep_beta_and_find_z_bounds", &sweep_beta_and_find_z_bounds, "Compute support boundaries by sweeping beta", py::arg("z_a"), py::arg("y"), py::arg("z_min"), py::arg("z_max"), py::arg("beta_steps"), py::arg("z_steps")); m.def("compute_cubic_roots", &compute_cubic_roots, "Compute roots of cubic equation", py::arg("z"), py::arg("beta"), py::arg("z_a"), py::arg("y")); m.def("compute_high_y_curve", &compute_high_y_curve, "Compute high y expression curve", py::arg("betas"), py::arg("z_a"), py::arg("y")); m.def("compute_alternate_low_expr", &compute_alternate_low_expr, "Compute alternate low expression curve", py::arg("betas"), py::arg("z_a"), py::arg("y")); m.def("compute_max_k_expression", &compute_max_k_expression, "Compute max k expression", py::arg("betas"), py::arg("z_a"), py::arg("y"), py::arg("k_samples") = 1000); m.def("compute_min_t_expression", &compute_min_t_expression, "Compute min t expression", py::arg("betas"), py::arg("z_a"), py::arg("y"), py::arg("t_samples") = 1000); m.def("compute_derivatives", &compute_derivatives, "Compute first and second derivatives", py::arg("curve"), py::arg("betas")); m.def("generate_eigenvalue_distribution", &generate_eigenvalue_distribution, "Generate eigenvalue distribution", py::arg("beta"), py::arg("y"), py::arg("z_a"), py::arg("n"), py::arg("seed")); m.def("compute_eigenvalue_support_boundaries", &compute_eigenvalue_support_boundaries, "Compute eigenvalue support boundaries", py::arg("z_a"), py::arg("y"), py::arg("beta_values"), py::arg("n_samples"), py::arg("seeds")); }