diff options
author | Campbell Barton <ideasman42@gmail.com> | 2019-04-17 07:17:24 +0300 |
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committer | Campbell Barton <ideasman42@gmail.com> | 2019-04-17 07:21:24 +0300 |
commit | e12c08e8d170b7ca40f204a5b0423c23a9fbc2c1 (patch) | |
tree | 8cf3453d12edb177a218ef8009357518ec6cab6a /source/blender/freestyle/intern/geometry/matrix_util.cpp | |
parent | b3dabc200a4b0399ec6b81f2ff2730d07b44fcaa (diff) |
ClangFormat: apply to source, most of intern
Apply clang format as proposed in T53211.
For details on usage and instructions for migrating branches
without conflicts, see:
https://wiki.blender.org/wiki/Tools/ClangFormat
Diffstat (limited to 'source/blender/freestyle/intern/geometry/matrix_util.cpp')
-rw-r--r-- | source/blender/freestyle/intern/geometry/matrix_util.cpp | 426 |
1 files changed, 213 insertions, 213 deletions
diff --git a/source/blender/freestyle/intern/geometry/matrix_util.cpp b/source/blender/freestyle/intern/geometry/matrix_util.cpp index 44490f4bde5..811b10813d1 100644 --- a/source/blender/freestyle/intern/geometry/matrix_util.cpp +++ b/source/blender/freestyle/intern/geometry/matrix_util.cpp @@ -39,222 +39,222 @@ namespace OGF { namespace MatrixUtil { - static const double EPS = 0.00001; - static int MAX_ITER = 100; - - void semi_definite_symmetric_eigen(const double *mat, int n, double *eigen_vec, double *eigen_val) - { - double *a, *v; - double a_norm, a_normEPS, thr, thr_nn; - int nb_iter = 0; - int jj; - int i, j, k, ij, ik, l, m, lm, mq, lq, ll, mm, imv, im, iq, ilv, il, nn; - int *index; - double a_ij, a_lm, a_ll, a_mm, a_im, a_il; - double a_lm_2; - double v_ilv, v_imv; - double x; - double sinx, sinx_2, cosx, cosx_2, sincos; - double delta; - - // Number of entries in mat - nn = (n * (n + 1)) / 2; - - // Step 1: Copy mat to a - a = new double[nn]; - - for (ij = 0; ij < nn; ij++) { - a[ij] = mat[ij]; - } - - // Ugly Fortran-porting trick: indices for a are between 1 and n - a--; - - // Step 2 : Init diagonalization matrix as the unit matrix - v = new double[n * n]; - - ij = 0; - for (i = 0; i < n; i++) { - for (j = 0; j < n; j++) { - if (i == j) { - v[ij++] = 1.0; - } - else { - v[ij++] = 0.0; - } - } - } - - // Ugly Fortran-porting trick: indices for v are between 1 and n - v--; - - // Step 3 : compute the weight of the non diagonal terms - ij = 1; - a_norm = 0.0; - for (i = 1; i <= n; i++) { - for (j = 1; j <= i; j++) { - if (i != j) { - a_ij = a[ij]; - a_norm += a_ij * a_ij; - } - ij++; - } - } - - if (a_norm != 0.0) { - a_normEPS = a_norm * EPS; - thr = a_norm; - - // Step 4 : rotations - while (thr > a_normEPS && nb_iter < MAX_ITER) { - nb_iter++; - thr_nn = thr / nn; - - for (l = 1; l < n; l++) { - for (m = l + 1; m <= n; m++) { - // compute sinx and cosx - lq = (l * l - l) / 2; - mq = (m * m - m) / 2; - - lm = l + mq; - a_lm = a[lm]; - a_lm_2 = a_lm * a_lm; - - if (a_lm_2 < thr_nn) { - continue; - } - - ll = l + lq; - mm = m + mq; - a_ll = a[ll]; - a_mm = a[mm]; - - delta = a_ll - a_mm; - - if (delta == 0.0) { - x = -M_PI / 4; - } - else { - x = -atan((a_lm + a_lm) / delta) / 2.0; - } - - sinx = sin(x); - cosx = cos(x); - sinx_2 = sinx * sinx; - cosx_2 = cosx * cosx; - sincos = sinx * cosx; - - // rotate L and M columns - ilv = n * (l - 1); - imv = n * (m - 1); - - for (i = 1; i <= n; i++) { - if ((i != l) && (i != m)) { - iq = (i * i - i) / 2; - - if (i < m) { - im = i + mq; - } - else { - im = m + iq; - } - a_im = a[im]; - - if (i < l) { - il = i + lq; - } - else { - il = l + iq; - } - a_il = a[il]; - - a[il] = a_il * cosx - a_im * sinx; - a[im] = a_il * sinx + a_im * cosx; - } - - ilv++; - imv++; - - v_ilv = v[ilv]; - v_imv = v[imv]; - - v[ilv] = cosx * v_ilv - sinx * v_imv; - v[imv] = sinx * v_ilv + cosx * v_imv; - } - - x = a_lm * sincos; - x += x; - - a[ll] = a_ll * cosx_2 + a_mm * sinx_2 - x; - a[mm] = a_ll * sinx_2 + a_mm * cosx_2 + x; - a[lm] = 0.0; - - thr = fabs(thr - a_lm_2); - } - } - } - } - - // Step 5: index conversion and copy eigen values - - // back from Fortran to C++ - a++; - - for (i = 0; i < n; i++) { - k = i + (i * (i + 1)) / 2; - eigen_val[i] = a[k]; - } - - delete[] a; - - // Step 6: sort the eigen values and eigen vectors - - index = new int[n]; - for (i = 0; i < n; i++) { - index[i] = i; - } - - for (i = 0; i < (n - 1); i++) { - x = eigen_val[i]; - k = i; - - for (j = i + 1; j < n; j++) { - if (x < eigen_val[j]) { - k = j; - x = eigen_val[j]; - } - } - - eigen_val[k] = eigen_val[i]; - eigen_val[i] = x; - - jj = index[k]; - index[k] = index[i]; - index[i] = jj; - } - - // Step 7: save the eigen vectors - - // back from Fortran to C++ - v++; - - ij = 0; - for (k = 0; k < n; k++) { - ik = index[k] * n; - for (i = 0; i < n; i++) { - eigen_vec[ij++] = v[ik++]; - } - } - - delete[] v; - delete[] index; - return; - } +static const double EPS = 0.00001; +static int MAX_ITER = 100; + +void semi_definite_symmetric_eigen(const double *mat, int n, double *eigen_vec, double *eigen_val) +{ + double *a, *v; + double a_norm, a_normEPS, thr, thr_nn; + int nb_iter = 0; + int jj; + int i, j, k, ij, ik, l, m, lm, mq, lq, ll, mm, imv, im, iq, ilv, il, nn; + int *index; + double a_ij, a_lm, a_ll, a_mm, a_im, a_il; + double a_lm_2; + double v_ilv, v_imv; + double x; + double sinx, sinx_2, cosx, cosx_2, sincos; + double delta; + + // Number of entries in mat + nn = (n * (n + 1)) / 2; + + // Step 1: Copy mat to a + a = new double[nn]; + + for (ij = 0; ij < nn; ij++) { + a[ij] = mat[ij]; + } + + // Ugly Fortran-porting trick: indices for a are between 1 and n + a--; + + // Step 2 : Init diagonalization matrix as the unit matrix + v = new double[n * n]; + + ij = 0; + for (i = 0; i < n; i++) { + for (j = 0; j < n; j++) { + if (i == j) { + v[ij++] = 1.0; + } + else { + v[ij++] = 0.0; + } + } + } + + // Ugly Fortran-porting trick: indices for v are between 1 and n + v--; + + // Step 3 : compute the weight of the non diagonal terms + ij = 1; + a_norm = 0.0; + for (i = 1; i <= n; i++) { + for (j = 1; j <= i; j++) { + if (i != j) { + a_ij = a[ij]; + a_norm += a_ij * a_ij; + } + ij++; + } + } + + if (a_norm != 0.0) { + a_normEPS = a_norm * EPS; + thr = a_norm; + + // Step 4 : rotations + while (thr > a_normEPS && nb_iter < MAX_ITER) { + nb_iter++; + thr_nn = thr / nn; + + for (l = 1; l < n; l++) { + for (m = l + 1; m <= n; m++) { + // compute sinx and cosx + lq = (l * l - l) / 2; + mq = (m * m - m) / 2; + + lm = l + mq; + a_lm = a[lm]; + a_lm_2 = a_lm * a_lm; + + if (a_lm_2 < thr_nn) { + continue; + } + + ll = l + lq; + mm = m + mq; + a_ll = a[ll]; + a_mm = a[mm]; + + delta = a_ll - a_mm; + + if (delta == 0.0) { + x = -M_PI / 4; + } + else { + x = -atan((a_lm + a_lm) / delta) / 2.0; + } + + sinx = sin(x); + cosx = cos(x); + sinx_2 = sinx * sinx; + cosx_2 = cosx * cosx; + sincos = sinx * cosx; + + // rotate L and M columns + ilv = n * (l - 1); + imv = n * (m - 1); + + for (i = 1; i <= n; i++) { + if ((i != l) && (i != m)) { + iq = (i * i - i) / 2; + + if (i < m) { + im = i + mq; + } + else { + im = m + iq; + } + a_im = a[im]; + + if (i < l) { + il = i + lq; + } + else { + il = l + iq; + } + a_il = a[il]; + + a[il] = a_il * cosx - a_im * sinx; + a[im] = a_il * sinx + a_im * cosx; + } + + ilv++; + imv++; + + v_ilv = v[ilv]; + v_imv = v[imv]; + + v[ilv] = cosx * v_ilv - sinx * v_imv; + v[imv] = sinx * v_ilv + cosx * v_imv; + } + + x = a_lm * sincos; + x += x; + + a[ll] = a_ll * cosx_2 + a_mm * sinx_2 - x; + a[mm] = a_ll * sinx_2 + a_mm * cosx_2 + x; + a[lm] = 0.0; + + thr = fabs(thr - a_lm_2); + } + } + } + } + + // Step 5: index conversion and copy eigen values + + // back from Fortran to C++ + a++; + + for (i = 0; i < n; i++) { + k = i + (i * (i + 1)) / 2; + eigen_val[i] = a[k]; + } + + delete[] a; + + // Step 6: sort the eigen values and eigen vectors + + index = new int[n]; + for (i = 0; i < n; i++) { + index[i] = i; + } + + for (i = 0; i < (n - 1); i++) { + x = eigen_val[i]; + k = i; + + for (j = i + 1; j < n; j++) { + if (x < eigen_val[j]) { + k = j; + x = eigen_val[j]; + } + } + + eigen_val[k] = eigen_val[i]; + eigen_val[i] = x; + + jj = index[k]; + index[k] = index[i]; + index[i] = jj; + } + + // Step 7: save the eigen vectors + + // back from Fortran to C++ + v++; + + ij = 0; + for (k = 0; k < n; k++) { + ik = index[k] * n; + for (i = 0; i < n; i++) { + eigen_vec[ij++] = v[ik++]; + } + } + + delete[] v; + delete[] index; + return; +} //_________________________________________________________ -} // MatrixUtil namespace +} // namespace MatrixUtil -} // OGF namespace +} // namespace OGF } /* namespace Freestyle */ |