Christophe
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/// @ref gtx_matrix_factorisation
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/// @file glm/gtx/matrix_factorisation.hpp
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///
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/// @see core (dependence)
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///
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/// @defgroup gtx_matrix_factorisation GLM_GTX_matrix_factorisation
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/// @ingroup gtx
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///
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/// @brief Functions to factor matrices in various forms
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///
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/// <glm/gtx/matrix_factorisation.hpp> need to be included to use these functionalities.
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#pragma once |
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// Dependency:
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#include "../glm.hpp" |
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#ifndef GLM_ENABLE_EXPERIMENTAL |
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# error "GLM: GLM_GTX_matrix_factorisation is an experimental extension and may change in the future. Use #define GLM_ENABLE_EXPERIMENTAL before including it, if you really want to use it." |
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#endif |
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#if GLM_MESSAGES == GLM_MESSAGES_ENABLED && !defined(GLM_EXT_INCLUDED) |
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# pragma message("GLM: GLM_GTX_matrix_factorisation extension included") |
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#endif |
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/*
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Suggestions: |
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- Move helper functions flipud and fliplr to another file: They may be helpful in more general circumstances. |
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- Implement other types of matrix factorisation, such as: QL and LQ, L(D)U, eigendecompositions, etc... |
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*/ |
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namespace glm{ |
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/// @addtogroup gtx_matrix_factorisation
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/// @{
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/// Flips the matrix rows up and down.
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/// From GLM_GTX_matrix_factorisation extension.
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template <length_t C, length_t R, typename T, precision P, template<length_t, length_t, typename, precision> class matType> |
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GLM_FUNC_DECL matType<C, R, T, P> flipud(const matType<C, R, T, P>& in); |
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/// Flips the matrix columns right and left.
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/// From GLM_GTX_matrix_factorisation extension.
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template <length_t C, length_t R, typename T, precision P, template<length_t, length_t, typename, precision> class matType> |
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GLM_FUNC_DECL matType<C, R, T, P> fliplr(const matType<C, R, T, P>& in); |
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/// Performs QR factorisation of a matrix.
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/// Returns 2 matrices, q and r, such that the columns of q are orthonormal and span the same subspace than those of the input matrix, r is an upper triangular matrix, and q*r=in.
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/// Given an n-by-m input matrix, q has dimensions min(n,m)-by-m, and r has dimensions n-by-min(n,m).
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/// From GLM_GTX_matrix_factorisation extension.
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template <length_t C, length_t R, typename T, precision P, template<length_t, length_t, typename, precision> class matType> |
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GLM_FUNC_DECL void qr_decompose(matType<(C < R ? C : R), R, T, P>& q, matType<C, (C < R ? C : R), T, P>& r, const matType<C, R, T, P>& in); |
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/// Performs RQ factorisation of a matrix.
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/// Returns 2 matrices, r and q, such that r is an upper triangular matrix, the rows of q are orthonormal and span the same subspace than those of the input matrix, and r*q=in.
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/// Note that in the context of RQ factorisation, the diagonal is seen as starting in the lower-right corner of the matrix, instead of the usual upper-left.
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/// Given an n-by-m input matrix, r has dimensions min(n,m)-by-m, and q has dimensions n-by-min(n,m).
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/// From GLM_GTX_matrix_factorisation extension.
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template <length_t C, length_t R, typename T, precision P, template<length_t, length_t, typename, precision> class matType> |
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GLM_FUNC_DECL void rq_decompose(matType<(C < R ? C : R), R, T, P>& r, matType<C, (C < R ? C : R), T, P>& q, const matType<C, R, T, P>& in); |
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/// @}
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} |
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#include "matrix_factorisation.inl" |
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/// @ref gtx_matrix_factorisation |
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/// @file glm/gtx/matrix_factorisation.inl |
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namespace glm { |
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template <length_t C, length_t R, typename T, precision P, template<length_t, length_t, typename, precision> class matType> |
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GLM_FUNC_QUALIFIER matType<C, R, T, P> flipud(const matType<C, R, T, P>& in) { |
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matType<R, C, T, P> tin = transpose(in); |
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tin = fliplr(tin); |
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matType<C, R, T, P> out = transpose(tin); |
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return out; |
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} |
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template <length_t C, length_t R, typename T, precision P, template<length_t, length_t, typename, precision> class matType> |
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GLM_FUNC_QUALIFIER matType<C, R, T, P> fliplr(const matType<C, R, T, P>& in) { |
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matType<C, R, T, P> out; |
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for (length_t i = 0; i < C; i++) { |
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out[i] = in[(C - i) - 1]; |
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} |
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return out; |
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} |
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template <length_t C, length_t R, typename T, precision P, template<length_t, length_t, typename, precision> class matType> |
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GLM_FUNC_QUALIFIER void qr_decompose(matType<(C < R ? C : R), R, T, P>& q, matType<C, (C < R ? C : R), T, P>& r, const matType<C, R, T, P>& in) { |
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// Uses modified Gram-Schmidt method |
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// Source: https://en.wikipedia.org/wiki/Gram–Schmidt_process |
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// And https://en.wikipedia.org/wiki/QR_decomposition |
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//For all the linearly independs columns of the input... |
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// (there can be no more linearly independents columns than there are rows.) |
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for (length_t i = 0; i < (C < R ? C : R); i++) { |
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//Copy in Q the input's i-th column. |
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q[i] = in[i]; |
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//j = [0,i[ |
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// Make that column orthogonal to all the previous ones by substracting to it the non-orthogonal projection of all the previous columns. |
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// Also: Fill the zero elements of R |
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for (length_t j = 0; j < i; j++) { |
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q[i] -= dot(q[i], q[j])*q[j]; |
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r[j][i] = 0; |
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} |
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//Now, Q i-th column is orthogonal to all the previous columns. Normalize it. |
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q[i] = normalize(q[i]); |
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//j = [i,C[ |
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//Finally, compute the corresponding coefficients of R by computing the projection of the resulting column on the other columns of the input. |
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for (length_t j = i; j < C; j++) { |
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r[j][i] = dot(in[j], q[i]); |
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} |
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} |
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} |
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template <length_t C, length_t R, typename T, precision P, template<length_t, length_t, typename, precision> class matType> |
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GLM_FUNC_QUALIFIER void rq_decompose(matType<(C < R ? C : R), R, T, P>& r, matType<C, (C < R ? C : R), T, P>& q, const matType<C, R, T, P>& in) { |
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// From https://en.wikipedia.org/wiki/QR_decomposition: |
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// The RQ decomposition transforms a matrix A into the product of an upper triangular matrix R (also known as right-triangular) and an orthogonal matrix Q. The only difference from QR decomposition is the order of these matrices. |
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// QR decomposition is Gram–Schmidt orthogonalization of columns of A, started from the first column. |
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// RQ decomposition is Gram–Schmidt orthogonalization of rows of A, started from the last row. |
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matType<R, C, T, P> tin = transpose(in); |
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tin = fliplr(tin); |
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matType<R, (C < R ? C : R), T, P> tr; |
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matType<(C < R ? C : R), C, T, P> tq; |
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qr_decompose(tq, tr, tin); |
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tr = fliplr(tr); |
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r = transpose(tr); |
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r = fliplr(r); |
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tq = fliplr(tq); |
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q = transpose(tq); |
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} |
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} //namespace glm |
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#define GLM_ENABLE_EXPERIMENTAL |
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#include <glm/gtx/matrix_factorisation.hpp> |
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const double epsilon = 1e-10f; |
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template <glm::length_t C, glm::length_t R, typename T, glm::precision P, template<glm::length_t, glm::length_t, typename, glm::precision> class matType> |
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int test_qr(matType<C, R, T, P> m) { |
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matType<(C < R ? C : R), R, T, P> q(-999); |
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matType<C, (C < R ? C : R), T, P> r(-999); |
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glm::qr_decompose(q, r, m); |
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//Test if q*r really equals the input matrix
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matType<C, R, T, P> tm = q*r; |
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matType<C, R, T, P> err = tm - m; |
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for (glm::length_t i = 0; i < C; i++) { |
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for (glm::length_t j = 0; j < R; j++) { |
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if (std::abs(err[i][j]) > epsilon) return 1; |
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} |
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} |
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//Test if the columns of q are orthonormal
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for (glm::length_t i = 0; i < (C < R ? C : R); i++) { |
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if ((length(q[i]) - 1) > epsilon) return 2; |
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for (glm::length_t j = 0; j<i; j++) { |
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if (std::abs(dot(q[i], q[j])) > epsilon) return 3; |
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} |
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} |
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//Test if the matrix r is upper triangular
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for (glm::length_t i = 0; i < C; i++) { |
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for (glm::length_t j = i + 1; j < (C < R ? C : R); j++) { |
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if (r[i][j] != 0) return 4; |
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} |
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} |
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return 0; |
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} |
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template <glm::length_t C, glm::length_t R, typename T, glm::precision P, template<glm::length_t, glm::length_t, typename, glm::precision> class matType> |
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int test_rq(matType<C, R, T, P> m) { |
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matType<C, (C < R ? C : R), T, P> q(-999); |
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matType<(C < R ? C : R), R, T, P> r(-999); |
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glm::rq_decompose(r, q, m); |
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//Test if q*r really equals the input matrix
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matType<C, R, T, P> tm = r*q; |
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matType<C, R, T, P> err = tm - m; |
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for (glm::length_t i = 0; i < C; i++) { |
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for (glm::length_t j = 0; j < R; j++) { |
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if (std::abs(err[i][j]) > epsilon) return 1; |
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} |
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} |
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//Test if the rows of q are orthonormal
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matType<(C < R ? C : R), C, T, P> tq = transpose(q); |
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for (glm::length_t i = 0; i < (C < R ? C : R); i++) { |
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if ((length(tq[i]) - 1) > epsilon) return 2; |
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for (glm::length_t j = 0; j<i; j++) { |
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if (std::abs(dot(tq[i], tq[j])) > epsilon) return 3; |
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} |
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} |
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//Test if the matrix r is upper triangular
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for (glm::length_t i = 0; i < (C < R ? C : R); i++) { |
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for (glm::length_t j = R - (C < R ? C : R) + i + 1; j < R; j++) { |
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if (r[i][j] != 0) return 4; |
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} |
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} |
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return 0; |
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} |
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int main() |
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{ |
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//Test QR square
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if(test_qr(glm::dmat3(12, 6, -4, -51, 167, 24, 4, -68, -41))) return 1; |
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//Test RQ square
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if (test_rq(glm::dmat3(12, 6, -4, -51, 167, 24, 4, -68, -41))) return 2; |
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//Test QR triangular 1
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if (test_qr(glm::dmat3x4(12, 6, -4, -51, 167, 24, 4, -68, -41, 7, 2, 15))) return 3; |
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//Test QR triangular 2
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if (test_qr(glm::dmat4x3(12, 6, -4, -51, 167, 24, 4, -68, -41, 7, 2, 15))) return 4; |
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//Test RQ triangular 1 : Fails at the triangular test
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if (test_rq(glm::dmat3x4(12, 6, -4, -51, 167, 24, 4, -68, -41, 7, 2, 15))) return 5; |
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//Test QR triangular 2
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if (test_rq(glm::dmat4x3(12, 6, -4, -51, 167, 24, 4, -68, -41, 7, 2, 15))) return 6; |
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return 0; |
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} |
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