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Searched full:subdiag (Results 1 - 4 of 4) sorted by null

/external/eigen/doc/snippets/
Tridiagonalization_decomposeInPlace.cpp	`6 VectorXd subdiag(4); 7 internal::tridiagonalization_inplace(A, diag, subdiag, true); 10 cout << "The subdiagonal of the tridiagonal matrix T is:" << endl << subdiag << endl;`
Tridiagonalization_diagonal.cpp	`12 VectorXd subdiag = triOfA.subDiagonal(); variable 13 cout << "The subdiagonal is:" << endl << subdiag << endl;`
/external/eigen/Eigen/src/Eigenvalues/
Tridiagonalization.h	393 * \param[out] subdiag The subdiagonal of the tridiagonal matrix T in 402 * The tridiagonal matrix T is passed to the output parameters \p diag and \p subdiag. If 406 * The vectors \p diag and \p subdiag are not resized. The function 409 * length of the vector \p subdiag should be one left. 426 void tridiagonalization_inplace(MatrixType& mat, DiagonalType& diag, SubDiagonalType& subdiag, bool extractQ) 430 eigen_assert(mat.cols()==mat.rows() && diag.size()==mat.rows() && subdiag.size()==mat.rows()-1); 431 tridiagonalization_inplace_selector<MatrixType>::run(mat, diag, subdiag, extractQ); 444 static void run(MatrixType& mat, DiagonalType& diag, SubDiagonalType& subdiag, bool extractQ) 449 subdiag = mat.template diagonal<-1>().real(); 468 static void run(MatrixType& mat, DiagonalType& diag, SubDiagonalType& subdiag, bool extractQ [all...]
SelfAdjointEigenSolver.h	367 * pair of two vectors \a diag and \a subdiag. 380 static void tridiagonal_qr_step(RealScalar* diag, RealScalar* subdiag, Index start, Index end, Scalar* matrixQ, Index n); 737 static void tridiagonal_qr_step(RealScalar* diag, RealScalar* subdiag, Index start, Index end, Scalar* matrixQ, Index n) 740 RealScalar e = subdiag[end-1]; 743 // RealScalar e2 = abs2(subdiag[end-1]); 749 RealScalar z = subdiag[start]; 756 RealScalar sdk = rot.s() * diag[k] + rot.c() * subdiag[k]; 757 RealScalar dkp1 = rot.s() * subdiag[k] + rot.c() * diag[k+1]; 759 diag[k] = rot.c() * (rot.c() * diag[k] - rot.s() * subdiag[k]) - rot.s() * (rot.c() * subdiag[k] - rot.s() * diag[k+1]) [all...]

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