| /dports/mail/qpopper/qpopper4.1.0/mmangle/ |
| H A D | mangle.c | 116 mS->outFn(mS->outFnState, "Mime-version: 1.0\n",18); in headerHandler()
119 mS->outFn(mS->outFnState, "Content-Type: text/html;",24); in headerHandler()
122 mS->outFn(mS->outFnState, "Content-Type: text/plain;",25); in headerHandler()
125 mS->outFn(mS->outFnState, "Content-Type: text/enriched;",28); in headerHandler()
130 mS->outFn(mS->outFnState, "charset=\"", 9); in headerHandler()
131 mS->outFn(mS->outFnState, charsetAttributes[mS->rqInfo.m_char_set], in headerHandler()
133 mS->outFn(mS->outFnState, "\"\n",2); in headerHandler()
134 mS->outFn(mS->outFnState, header, len); in headerHandler()
140 mS->outFn(mS->outFnState, header, len); in headerHandler()
146 mS->outFn(mS->outFnState, header, len); in headerHandler()
[all …]
|
| /dports/graphics/nomacs/nomacs-3.16.224/ImageLounge/src/DkGui/ |
| H A D | DkPong.cpp | 158 mS = settings; in DkPongPlayer()
202 mRect.setHeight(qRound(mS->field().height()*mS->playerRatio())); in updateSize()
224 mS = settings; in DkScoreLabel()
283 mBall = DkBall(mS); in DkPongPort()
284 mPlayer1 = DkPongPlayer(mS->player1Name(), mS); in DkPongPort()
285 mPlayer2 = DkPongPlayer(mS->player2Name(), mS); in DkPongPort()
344 if (mPlayer1.score() >= mS->totalScore() || mPlayer2.score() >= mS->totalScore()) { in pauseGame()
361 return mS; in settings()
483 if (mPlayer1.score() >= mS->totalScore() || mPlayer2.score() >= mS->totalScore()) { in gameLoop()
540 mS = settings; in DkBall()
[all …]
|
| /dports/net-mgmt/thanos/thanos-0.11.0/vendor/go.elastic.co/apm/internal/wildcard/ |
| H A D | matcher_test.go | 30 mS := NewMatcher("foo*", CaseSensitive)
32 for _, m := range []*Matcher{mS, mI} {
40 assert.False(t, mS.Match("FoO"))
44 mS := NewMatcher("*foo", CaseSensitive)
46 for _, m := range []*Matcher{mS, mI} {
55 assert.False(t, mS.Match("BaRFoO"))
59 mS := NewMatcher("foo", CaseSensitive)
61 for _, m := range []*Matcher{mS, mI} {
69 assert.False(t, mS.Match("FoO"))
73 mS := NewMatcher("*", CaseSensitive)
[all …]
|
| /dports/devel/android-tools-adb/platform_system_core-android-9.0.0_r3/toolbox/upstream-netbsd/bin/dd/ |
| H A D | misc.c | 98 int64_t mS; in posix_summary() local
105 mS = tv2mS(tv) - tv2mS(st.start); in posix_summary()
106 if (mS == 0) in posix_summary()
107 mS = 1; in posix_summary()
136 (long) (mS / 1000), in posix_summary()
137 (int) (mS % 1000), in posix_summary()
198 int64_t mS; in dd_write_msg() local
202 mS = tv2mS(tv) - tv2mS(st.start); in dd_write_msg()
203 if (mS == 0) in dd_write_msg()
204 mS = 1; in dd_write_msg()
[all …]
|
| /dports/lang/fpc-source/fpc-3.2.2/tests/webtbs/ |
| H A D | tw25170.pp | 22 mS: TMemoryStream;
31 mS := TMemoryStream.Create;
34 mW := TBinaryObjectWriter.Create(mS, 100);
41 mS.Position := 0;
42 mR := TBinaryObjectReaderFake.Create(mS, 100);
50 mS.Position := 0;
51 mR := TBinaryObjectReaderFake.Create(mS, 100);
62 mS.Free;
|
| /dports/math/vtk9/VTK-9.1.0/ThirdParty/eigen/vtkeigen/eigen/src/Eigenvalues/ |
| H A D | GeneralizedEigenSolver.h | 314 const MatrixType &mS = m_realQZ.matrixS(); in compute() local
320 if (i == size - 1 || mS.coeff(i+1, i) == Scalar(0)) in compute()
323 m_alphas.coeffRef(i) = mS.diagonal().coeff(i); in compute()
339 if (j > 0 && mS.coeff(j, j-1) != Scalar(0)) in compute()
343 …Matrix<Scalar, 2, 2> lhs = beta * mS.template block<2,2>(j-1,j-1) - alpha * mT.template block<2,2>… in compute()
349 …egment(st,sz).transpose().cwiseProduct(beta*mS.block(j,st,1,sz) - alpha*mT.block(j,st,1,sz)).sum()… in compute()
371 … Matrix<RealScalar,2,2> S2 = mS.template block<2,2>(i,i) * Matrix<Scalar,2,1>(b,a).asDiagonal(); in compute()
384 … cv.coeffRef(i) = -(static_cast<Scalar>(beta*mS.coeffRef(i,i+1)) - alpha*mT.coeffRef(i,i+1)) in compute()
385 / (static_cast<Scalar>(beta*mS.coeffRef(i,i)) - alpha*mT.coeffRef(i,i)); in compute()
390 if (j > 0 && mS.coeff(j, j-1) != Scalar(0)) in compute()
[all …]
|
| /dports/math/pdal/PDAL-2.3.0/vendor/eigen/Eigen/src/Eigenvalues/ |
| H A D | GeneralizedEigenSolver.h | 314 const MatrixType &mS = m_realQZ.matrixS(); in compute() local
320 if (i == size - 1 || mS.coeff(i+1, i) == Scalar(0)) in compute()
323 m_alphas.coeffRef(i) = mS.diagonal().coeff(i); in compute()
339 if (j > 0 && mS.coeff(j, j-1) != Scalar(0)) in compute()
343 …Matrix<Scalar, 2, 2> lhs = beta * mS.template block<2,2>(j-1,j-1) - alpha * mT.template block<2,2>… in compute()
349 …egment(st,sz).transpose().cwiseProduct(beta*mS.block(j,st,1,sz) - alpha*mT.block(j,st,1,sz)).sum()… in compute()
371 … Matrix<RealScalar,2,2> S2 = mS.template block<2,2>(i,i) * Matrix<Scalar,2,1>(b,a).asDiagonal(); in compute()
384 … cv.coeffRef(i) = -(static_cast<Scalar>(beta*mS.coeffRef(i,i+1)) - alpha*mT.coeffRef(i,i+1)) in compute()
385 / (static_cast<Scalar>(beta*mS.coeffRef(i,i)) - alpha*mT.coeffRef(i,i)); in compute()
390 if (j > 0 && mS.coeff(j, j-1) != Scalar(0)) in compute()
[all …]
|
| /dports/graphics/blender/blender-2.91.0/extern/Eigen3/Eigen/src/Eigenvalues/ |
| H A D | GeneralizedEigenSolver.h | 314 const MatrixType &mS = m_realQZ.matrixS(); in compute() local
320 if (i == size - 1 || mS.coeff(i+1, i) == Scalar(0)) in compute()
323 m_alphas.coeffRef(i) = mS.diagonal().coeff(i); in compute()
339 if (j > 0 && mS.coeff(j, j-1) != Scalar(0)) in compute()
343 …Matrix<Scalar, 2, 2> lhs = beta * mS.template block<2,2>(j-1,j-1) - alpha * mT.template block<2,2>… in compute()
349 …egment(st,sz).transpose().cwiseProduct(beta*mS.block(j,st,1,sz) - alpha*mT.block(j,st,1,sz)).sum()… in compute()
371 … Matrix<RealScalar,2,2> S2 = mS.template block<2,2>(i,i) * Matrix<Scalar,2,1>(b,a).asDiagonal(); in compute()
384 … cv.coeffRef(i) = -(static_cast<Scalar>(beta*mS.coeffRef(i,i+1)) - alpha*mT.coeffRef(i,i+1)) in compute()
385 / (static_cast<Scalar>(beta*mS.coeffRef(i,i)) - alpha*mT.coeffRef(i,i)); in compute()
390 if (j > 0 && mS.coeff(j, j-1) != Scalar(0)) in compute()
[all …]
|
| /dports/math/eigen3/eigen-3.3.9/Eigen/src/Eigenvalues/ |
| H A D | GeneralizedEigenSolver.h | 314 const MatrixType &mS = m_realQZ.matrixS(); in compute() local
320 if (i == size - 1 || mS.coeff(i+1, i) == Scalar(0)) in compute()
323 m_alphas.coeffRef(i) = mS.diagonal().coeff(i); in compute()
339 if (j > 0 && mS.coeff(j, j-1) != Scalar(0)) in compute()
343 …Matrix<Scalar, 2, 2> lhs = beta * mS.template block<2,2>(j-1,j-1) - alpha * mT.template block<2,2>… in compute()
349 …egment(st,sz).transpose().cwiseProduct(beta*mS.block(j,st,1,sz) - alpha*mT.block(j,st,1,sz)).sum()… in compute()
371 … Matrix<RealScalar,2,2> S2 = mS.template block<2,2>(i,i) * Matrix<Scalar,2,1>(b,a).asDiagonal(); in compute()
384 … cv.coeffRef(i) = -(static_cast<Scalar>(beta*mS.coeffRef(i,i+1)) - alpha*mT.coeffRef(i,i+1)) in compute()
385 / (static_cast<Scalar>(beta*mS.coeffRef(i,i)) - alpha*mT.coeffRef(i,i)); in compute()
390 if (j > 0 && mS.coeff(j, j-1) != Scalar(0)) in compute()
[all …]
|
| /dports/graphics/appleseed/appleseed-2.1.0-beta/src/thirdparty/bcd/ext/eigen/Eigen/src/Eigenvalues/ |
| H A D | GeneralizedEigenSolver.h | 315 const MatrixType &mS = m_realQZ.matrixS(); in compute() local
321 if (i == size - 1 || mS.coeff(i+1, i) == Scalar(0)) in compute()
324 m_alphas.coeffRef(i) = mS.diagonal().coeff(i); in compute()
340 if (j > 0 && mS.coeff(j, j-1) != Scalar(0)) in compute()
344 …Matrix<Scalar, 2, 2> lhs = beta * mS.template block<2,2>(j-1,j-1) - alpha * mT.template block<2,2>… in compute()
350 …egment(st,sz).transpose().cwiseProduct(beta*mS.block(j,st,1,sz) - alpha*mT.block(j,st,1,sz)).sum()… in compute()
372 … Matrix<RealScalar,2,2> S2 = mS.template block<2,2>(i,i) * Matrix<Scalar,2,1>(b,a).asDiagonal(); in compute()
385 … cv.coeffRef(i) = -(static_cast<Scalar>(beta*mS.coeffRef(i,i+1)) - alpha*mT.coeffRef(i,i+1)) in compute()
386 / (static_cast<Scalar>(beta*mS.coeffRef(i,i)) - alpha*mT.coeffRef(i,i)); in compute()
391 if (j > 0 && mS.coeff(j, j-1) != Scalar(0)) in compute()
[all …]
|
| /dports/math/stanmath/math-4.2.0/lib/eigen_3.3.9/Eigen/src/Eigenvalues/ |
| H A D | GeneralizedEigenSolver.h | 314 const MatrixType &mS = m_realQZ.matrixS(); in compute() local
320 if (i == size - 1 || mS.coeff(i+1, i) == Scalar(0)) in compute()
323 m_alphas.coeffRef(i) = mS.diagonal().coeff(i); in compute()
339 if (j > 0 && mS.coeff(j, j-1) != Scalar(0)) in compute()
343 …Matrix<Scalar, 2, 2> lhs = beta * mS.template block<2,2>(j-1,j-1) - alpha * mT.template block<2,2>… in compute()
349 …egment(st,sz).transpose().cwiseProduct(beta*mS.block(j,st,1,sz) - alpha*mT.block(j,st,1,sz)).sum()… in compute()
371 … Matrix<RealScalar,2,2> S2 = mS.template block<2,2>(i,i) * Matrix<Scalar,2,1>(b,a).asDiagonal(); in compute()
384 … cv.coeffRef(i) = -(static_cast<Scalar>(beta*mS.coeffRef(i,i+1)) - alpha*mT.coeffRef(i,i+1)) in compute()
385 / (static_cast<Scalar>(beta*mS.coeffRef(i,i)) - alpha*mT.coeffRef(i,i)); in compute()
390 if (j > 0 && mS.coeff(j, j-1) != Scalar(0)) in compute()
[all …]
|
| /dports/science/InsightToolkit/ITK-5.0.1/Modules/ThirdParty/Eigen3/src/itkeigen/Eigen/src/Eigenvalues/ |
| H A D | GeneralizedEigenSolver.h | 314 const MatrixType &mS = m_realQZ.matrixS(); in compute() local
320 if (i == size - 1 || mS.coeff(i+1, i) == Scalar(0)) in compute()
323 m_alphas.coeffRef(i) = mS.diagonal().coeff(i); in compute()
339 if (j > 0 && mS.coeff(j, j-1) != Scalar(0)) in compute()
343 …Matrix<Scalar, 2, 2> lhs = beta * mS.template block<2,2>(j-1,j-1) - alpha * mT.template block<2,2>… in compute()
349 …egment(st,sz).transpose().cwiseProduct(beta*mS.block(j,st,1,sz) - alpha*mT.block(j,st,1,sz)).sum()… in compute()
371 … Matrix<RealScalar,2,2> S2 = mS.template block<2,2>(i,i) * Matrix<Scalar,2,1>(b,a).asDiagonal(); in compute()
384 … cv.coeffRef(i) = -(static_cast<Scalar>(beta*mS.coeffRef(i,i+1)) - alpha*mT.coeffRef(i,i+1)) in compute()
385 / (static_cast<Scalar>(beta*mS.coeffRef(i,i)) - alpha*mT.coeffRef(i,i)); in compute()
390 if (j > 0 && mS.coeff(j, j-1) != Scalar(0)) in compute()
[all …]
|
| /dports/math/py-cvxpy/cvxpy-1.1.17/cvxpy/cvxcore/include/Eigen/src/Eigenvalues/ |
| H A D | GeneralizedEigenSolver.h | 314 const MatrixType &mS = m_realQZ.matrixS(); in compute() local
320 if (i == size - 1 || mS.coeff(i+1, i) == Scalar(0)) in compute()
323 m_alphas.coeffRef(i) = mS.diagonal().coeff(i); in compute()
339 if (j > 0 && mS.coeff(j, j-1) != Scalar(0)) in compute()
343 …Matrix<Scalar, 2, 2> lhs = beta * mS.template block<2,2>(j-1,j-1) - alpha * mT.template block<2,2>… in compute()
349 …egment(st,sz).transpose().cwiseProduct(beta*mS.block(j,st,1,sz) - alpha*mT.block(j,st,1,sz)).sum()… in compute()
371 … Matrix<RealScalar,2,2> S2 = mS.template block<2,2>(i,i) * Matrix<Scalar,2,1>(b,a).asDiagonal(); in compute()
384 … cv.coeffRef(i) = -(static_cast<Scalar>(beta*mS.coeffRef(i,i+1)) - alpha*mT.coeffRef(i,i+1)) in compute()
385 / (static_cast<Scalar>(beta*mS.coeffRef(i,i)) - alpha*mT.coeffRef(i,i)); in compute()
390 if (j > 0 && mS.coeff(j, j-1) != Scalar(0)) in compute()
[all …]
|
| /dports/cad/gmsh/gmsh-4.9.2-source/contrib/eigen/Eigen/src/Eigenvalues/ |
| H A D | GeneralizedEigenSolver.h | 314 const MatrixType &mS = m_realQZ.matrixS(); in compute() local
320 if (i == size - 1 || mS.coeff(i+1, i) == Scalar(0)) in compute()
323 m_alphas.coeffRef(i) = mS.diagonal().coeff(i); in compute()
339 if (j > 0 && mS.coeff(j, j-1) != Scalar(0)) in compute()
343 …Matrix<Scalar, 2, 2> lhs = beta * mS.template block<2,2>(j-1,j-1) - alpha * mT.template block<2,2>… in compute()
349 …egment(st,sz).transpose().cwiseProduct(beta*mS.block(j,st,1,sz) - alpha*mT.block(j,st,1,sz)).sum()… in compute()
371 … Matrix<RealScalar,2,2> S2 = mS.template block<2,2>(i,i) * Matrix<Scalar,2,1>(b,a).asDiagonal(); in compute()
384 … cv.coeffRef(i) = -(static_cast<Scalar>(beta*mS.coeffRef(i,i+1)) - alpha*mT.coeffRef(i,i+1)) in compute()
385 / (static_cast<Scalar>(beta*mS.coeffRef(i,i)) - alpha*mT.coeffRef(i,i)); in compute()
390 if (j > 0 && mS.coeff(j, j-1) != Scalar(0)) in compute()
[all …]
|
| /dports/math/R-cran-RcppEigen/RcppEigen/inst/include/Eigen/src/Eigenvalues/ |
| H A D | GeneralizedEigenSolver.h | 314 const MatrixType &mS = m_realQZ.matrixS(); in compute() local
320 if (i == size - 1 || mS.coeff(i+1, i) == Scalar(0)) in compute()
323 m_alphas.coeffRef(i) = mS.diagonal().coeff(i); in compute()
339 if (j > 0 && mS.coeff(j, j-1) != Scalar(0)) in compute()
343 …Matrix<Scalar, 2, 2> lhs = beta * mS.template block<2,2>(j-1,j-1) - alpha * mT.template block<2,2>… in compute()
349 …egment(st,sz).transpose().cwiseProduct(beta*mS.block(j,st,1,sz) - alpha*mT.block(j,st,1,sz)).sum()… in compute()
371 … Matrix<RealScalar,2,2> S2 = mS.template block<2,2>(i,i) * Matrix<Scalar,2,1>(b,a).asDiagonal(); in compute()
384 … cv.coeffRef(i) = -(static_cast<Scalar>(beta*mS.coeffRef(i,i+1)) - alpha*mT.coeffRef(i,i+1)) in compute()
385 / (static_cast<Scalar>(beta*mS.coeffRef(i,i)) - alpha*mT.coeffRef(i,i)); in compute()
390 if (j > 0 && mS.coeff(j, j-1) != Scalar(0)) in compute()
[all …]
|
| /dports/science/getdp/getdp-3.4.0-source/contrib/eigen/Eigen/src/Eigenvalues/ |
| H A D | GeneralizedEigenSolver.h | 314 const MatrixType &mS = m_realQZ.matrixS(); in compute() local
320 if (i == size - 1 || mS.coeff(i+1, i) == Scalar(0)) in compute()
323 m_alphas.coeffRef(i) = mS.diagonal().coeff(i); in compute()
339 if (j > 0 && mS.coeff(j, j-1) != Scalar(0)) in compute()
343 …Matrix<Scalar, 2, 2> lhs = beta * mS.template block<2,2>(j-1,j-1) - alpha * mT.template block<2,2>… in compute()
349 …egment(st,sz).transpose().cwiseProduct(beta*mS.block(j,st,1,sz) - alpha*mT.block(j,st,1,sz)).sum()… in compute()
371 … Matrix<RealScalar,2,2> S2 = mS.template block<2,2>(i,i) * Matrix<Scalar,2,1>(b,a).asDiagonal(); in compute()
384 … cv.coeffRef(i) = -(static_cast<Scalar>(beta*mS.coeffRef(i,i+1)) - alpha*mT.coeffRef(i,i+1)) in compute()
385 / (static_cast<Scalar>(beta*mS.coeffRef(i,i)) - alpha*mT.coeffRef(i,i)); in compute()
390 if (j > 0 && mS.coeff(j, j-1) != Scalar(0)) in compute()
[all …]
|
| /dports/devel/upp/upp/uppsrc/plugin/Eigen/Eigen/src/Eigenvalues/ |
| H A D | GeneralizedEigenSolver.h | 314 const MatrixType &mS = m_realQZ.matrixS(); in compute() local
320 if (i == size - 1 || mS.coeff(i+1, i) == Scalar(0)) in compute()
323 m_alphas.coeffRef(i) = mS.diagonal().coeff(i); in compute()
339 if (j > 0 && mS.coeff(j, j-1) != Scalar(0)) in compute()
343 …Matrix<Scalar, 2, 2> lhs = beta * mS.template block<2,2>(j-1,j-1) - alpha * mT.template block<2,2>… in compute()
349 …egment(st,sz).transpose().cwiseProduct(beta*mS.block(j,st,1,sz) - alpha*mT.block(j,st,1,sz)).sum()… in compute()
371 … Matrix<RealScalar,2,2> S2 = mS.template block<2,2>(i,i) * Matrix<Scalar,2,1>(b,a).asDiagonal(); in compute()
384 … cv.coeffRef(i) = -(static_cast<Scalar>(beta*mS.coeffRef(i,i+1)) - alpha*mT.coeffRef(i,i+1)) in compute()
385 / (static_cast<Scalar>(beta*mS.coeffRef(i,i)) - alpha*mT.coeffRef(i,i)); in compute()
390 if (j > 0 && mS.coeff(j, j-1) != Scalar(0)) in compute()
[all …]
|
| /dports/devel/vcglib/vcglib-2020.09/eigenlib/Eigen/src/Eigenvalues/ |
| H A D | GeneralizedEigenSolver.h | 315 const MatrixType &mS = m_realQZ.matrixS(); in compute() local
321 if (i == size - 1 || mS.coeff(i+1, i) == Scalar(0)) in compute()
324 m_alphas.coeffRef(i) = mS.diagonal().coeff(i); in compute()
340 if (j > 0 && mS.coeff(j, j-1) != Scalar(0)) in compute()
344 …Matrix<Scalar, 2, 2> lhs = beta * mS.template block<2,2>(j-1,j-1) - alpha * mT.template block<2,2>… in compute()
350 …egment(st,sz).transpose().cwiseProduct(beta*mS.block(j,st,1,sz) - alpha*mT.block(j,st,1,sz)).sum()… in compute()
372 … Matrix<RealScalar,2,2> S2 = mS.template block<2,2>(i,i) * Matrix<Scalar,2,1>(b,a).asDiagonal(); in compute()
385 … cv.coeffRef(i) = -(static_cast<Scalar>(beta*mS.coeffRef(i,i+1)) - alpha*mT.coeffRef(i,i+1)) in compute()
386 / (static_cast<Scalar>(beta*mS.coeffRef(i,i)) - alpha*mT.coeffRef(i,i)); in compute()
391 if (j > 0 && mS.coeff(j, j-1) != Scalar(0)) in compute()
[all …]
|
| /dports/math/libsemigroups/libsemigroups-1.3.7/extern/eigen-3.3.7/Eigen/src/Eigenvalues/ |
| H A D | GeneralizedEigenSolver.h | 314 const MatrixType &mS = m_realQZ.matrixS(); in compute() local
320 if (i == size - 1 || mS.coeff(i+1, i) == Scalar(0)) in compute()
323 m_alphas.coeffRef(i) = mS.diagonal().coeff(i); in compute()
339 if (j > 0 && mS.coeff(j, j-1) != Scalar(0)) in compute()
343 …Matrix<Scalar, 2, 2> lhs = beta * mS.template block<2,2>(j-1,j-1) - alpha * mT.template block<2,2>… in compute()
349 …egment(st,sz).transpose().cwiseProduct(beta*mS.block(j,st,1,sz) - alpha*mT.block(j,st,1,sz)).sum()… in compute()
371 … Matrix<RealScalar,2,2> S2 = mS.template block<2,2>(i,i) * Matrix<Scalar,2,1>(b,a).asDiagonal(); in compute()
384 … cv.coeffRef(i) = -(static_cast<Scalar>(beta*mS.coeffRef(i,i+1)) - alpha*mT.coeffRef(i,i+1)) in compute()
385 / (static_cast<Scalar>(beta*mS.coeffRef(i,i)) - alpha*mT.coeffRef(i,i)); in compute()
390 if (j > 0 && mS.coeff(j, j-1) != Scalar(0)) in compute()
[all …]
|
| /dports/science/pcmsolver/pcmsolver-1.3.0/external/eigen3/include/eigen3/Eigen/src/Eigenvalues/ |
| H A D | GeneralizedEigenSolver.h | 315 const MatrixType &mS = m_realQZ.matrixS(); in compute() local
321 if (i == size - 1 || mS.coeff(i+1, i) == Scalar(0)) in compute()
324 m_alphas.coeffRef(i) = mS.diagonal().coeff(i); in compute()
340 if (j > 0 && mS.coeff(j, j-1) != Scalar(0)) in compute()
344 …Matrix<Scalar, 2, 2> lhs = beta * mS.template block<2,2>(j-1,j-1) - alpha * mT.template block<2,2>… in compute()
350 …egment(st,sz).transpose().cwiseProduct(beta*mS.block(j,st,1,sz) - alpha*mT.block(j,st,1,sz)).sum()… in compute()
372 … Matrix<RealScalar,2,2> S2 = mS.template block<2,2>(i,i) * Matrix<Scalar,2,1>(b,a).asDiagonal(); in compute()
385 … cv.coeffRef(i) = -(static_cast<Scalar>(beta*mS.coeffRef(i,i+1)) - alpha*mT.coeffRef(i,i+1)) in compute()
386 / (static_cast<Scalar>(beta*mS.coeffRef(i,i)) - alpha*mT.coeffRef(i,i)); in compute()
391 if (j > 0 && mS.coeff(j, j-1) != Scalar(0)) in compute()
[all …]
|
| /dports/misc/openmvg/openMVG-2.0/src/third_party/eigen/Eigen/src/Eigenvalues/ |
| H A D | GeneralizedEigenSolver.h | 314 const MatrixType &mS = m_realQZ.matrixS(); in compute() local
320 if (i == size - 1 || mS.coeff(i+1, i) == Scalar(0)) in compute()
323 m_alphas.coeffRef(i) = mS.diagonal().coeff(i); in compute()
339 if (j > 0 && mS.coeff(j, j-1) != Scalar(0)) in compute()
343 …Matrix<Scalar, 2, 2> lhs = beta * mS.template block<2,2>(j-1,j-1) - alpha * mT.template block<2,2>… in compute()
349 …egment(st,sz).transpose().cwiseProduct(beta*mS.block(j,st,1,sz) - alpha*mT.block(j,st,1,sz)).sum()… in compute()
371 … Matrix<RealScalar,2,2> S2 = mS.template block<2,2>(i,i) * Matrix<Scalar,2,1>(b,a).asDiagonal(); in compute()
384 … cv.coeffRef(i) = -(static_cast<Scalar>(beta*mS.coeffRef(i,i+1)) - alpha*mT.coeffRef(i,i+1)) in compute()
385 / (static_cast<Scalar>(beta*mS.coeffRef(i,i)) - alpha*mT.coeffRef(i,i)); in compute()
390 if (j > 0 && mS.coeff(j, j-1) != Scalar(0)) in compute()
[all …]
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| /dports/misc/opennn/opennn-5.0.5/eigen/Eigen/src/Eigenvalues/ |
| H A D | GeneralizedEigenSolver.h | 314 const MatrixType &mS = m_realQZ.matrixS(); in compute() local
320 if (i == size - 1 || mS.coeff(i+1, i) == Scalar(0)) in compute()
323 m_alphas.coeffRef(i) = mS.diagonal().coeff(i); in compute()
339 if (j > 0 && mS.coeff(j, j-1) != Scalar(0)) in compute()
343 …Matrix<Scalar, 2, 2> lhs = beta * mS.template block<2,2>(j-1,j-1) - alpha * mT.template block<2,2>… in compute()
349 …egment(st,sz).transpose().cwiseProduct(beta*mS.block(j,st,1,sz) - alpha*mT.block(j,st,1,sz)).sum()… in compute()
371 … Matrix<RealScalar,2,2> S2 = mS.template block<2,2>(i,i) * Matrix<Scalar,2,1>(b,a).asDiagonal(); in compute()
384 … cv.coeffRef(i) = -(static_cast<Scalar>(beta*mS.coeffRef(i,i+1)) - alpha*mT.coeffRef(i,i+1)) in compute()
385 / (static_cast<Scalar>(beta*mS.coeffRef(i,i)) - alpha*mT.coeffRef(i,i)); in compute()
390 if (j > 0 && mS.coeff(j, j-1) != Scalar(0)) in compute()
[all …]
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| /dports/devel/taskflow/taskflow-3.2.0/3rd-party/eigen-3.3.7/Eigen/src/Eigenvalues/ |
| H A D | GeneralizedEigenSolver.h | 314 const MatrixType &mS = m_realQZ.matrixS(); in compute() local
320 if (i == size - 1 || mS.coeff(i+1, i) == Scalar(0)) in compute()
323 m_alphas.coeffRef(i) = mS.diagonal().coeff(i); in compute()
339 if (j > 0 && mS.coeff(j, j-1) != Scalar(0)) in compute()
343 …Matrix<Scalar, 2, 2> lhs = beta * mS.template block<2,2>(j-1,j-1) - alpha * mT.template block<2,2>… in compute()
349 …egment(st,sz).transpose().cwiseProduct(beta*mS.block(j,st,1,sz) - alpha*mT.block(j,st,1,sz)).sum()… in compute()
371 … Matrix<RealScalar,2,2> S2 = mS.template block<2,2>(i,i) * Matrix<Scalar,2,1>(b,a).asDiagonal(); in compute()
384 … cv.coeffRef(i) = -(static_cast<Scalar>(beta*mS.coeffRef(i,i+1)) - alpha*mT.coeffRef(i,i+1)) in compute()
385 / (static_cast<Scalar>(beta*mS.coeffRef(i,i)) - alpha*mT.coeffRef(i,i)); in compute()
390 if (j > 0 && mS.coeff(j, j-1) != Scalar(0)) in compute()
[all …]
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| /dports/math/vtk8/VTK-8.2.0/ThirdParty/eigen/vtkeigen/eigen/src/Eigenvalues/ |
| H A D | GeneralizedEigenSolver.h | 315 const MatrixType &mS = m_realQZ.matrixS(); in compute() local
321 if (i == size - 1 || mS.coeff(i+1, i) == Scalar(0)) in compute()
324 m_alphas.coeffRef(i) = mS.diagonal().coeff(i); in compute()
340 if (j > 0 && mS.coeff(j, j-1) != Scalar(0)) in compute()
344 …Matrix<Scalar, 2, 2> lhs = beta * mS.template block<2,2>(j-1,j-1) - alpha * mT.template block<2,2>… in compute()
350 …egment(st,sz).transpose().cwiseProduct(beta*mS.block(j,st,1,sz) - alpha*mT.block(j,st,1,sz)).sum()… in compute()
372 … Matrix<RealScalar,2,2> S2 = mS.template block<2,2>(i,i) * Matrix<Scalar,2,1>(b,a).asDiagonal(); in compute()
385 … cv.coeffRef(i) = -(static_cast<Scalar>(beta*mS.coeffRef(i,i+1)) - alpha*mT.coeffRef(i,i+1)) in compute()
386 / (static_cast<Scalar>(beta*mS.coeffRef(i,i)) - alpha*mT.coeffRef(i,i)); in compute()
391 if (j > 0 && mS.coeff(j, j-1) != Scalar(0)) in compute()
[all …]
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| /dports/cad/PrusaSlicer/PrusaSlicer-version_2.3.3/src/eigen/Eigen/src/Eigenvalues/ |
| H A D | GeneralizedEigenSolver.h | 314 const MatrixType &mS = m_realQZ.matrixS(); in compute() local
320 if (i == size - 1 || mS.coeff(i+1, i) == Scalar(0)) in compute()
323 m_alphas.coeffRef(i) = mS.diagonal().coeff(i); in compute()
339 if (j > 0 && mS.coeff(j, j-1) != Scalar(0)) in compute()
343 …Matrix<Scalar, 2, 2> lhs = beta * mS.template block<2,2>(j-1,j-1) - alpha * mT.template block<2,2>… in compute()
349 …egment(st,sz).transpose().cwiseProduct(beta*mS.block(j,st,1,sz) - alpha*mT.block(j,st,1,sz)).sum()… in compute()
371 … Matrix<RealScalar,2,2> S2 = mS.template block<2,2>(i,i) * Matrix<Scalar,2,1>(b,a).asDiagonal(); in compute()
384 … cv.coeffRef(i) = -(static_cast<Scalar>(beta*mS.coeffRef(i,i+1)) - alpha*mT.coeffRef(i,i+1)) in compute()
385 / (static_cast<Scalar>(beta*mS.coeffRef(i,i)) - alpha*mT.coeffRef(i,i)); in compute()
390 if (j > 0 && mS.coeff(j, j-1) != Scalar(0)) in compute()
[all …]
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