/external/eigen/unsupported/Eigen/src/MatrixFunctions/ |
MatrixFunction.h | 65 * \brief Partial specialization of MatrixFunction for real matrices 97 * This function converts the real matrix \c A to a complex matrix, 99 * a real matrix. 108 result = Cresult.real(); 133 typedef typename NumTraits<Scalar>::Real RealScalar; 518 typedef std::complex<typename NumTraits<Scalar>::Real> ComplexScalar;
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MatrixLogarithm.h | 37 typedef typename NumTraits<Scalar>::Real RealScalar; 446 typedef std::complex<typename NumTraits<Scalar>::Real> ComplexScalar;
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MatrixExponential.h | 115 * The argument of this function should correspond with the (real 134 typedef typename NumTraits<Scalar>::Real RealScalar;
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/external/eigen/Eigen/src/Core/ |
SelfAdjointView.h | 157 /** Real part of #Scalar */ 158 typedef typename NumTraits<Scalar>::Real RealScalar; 217 dst.coeffRef(row, col) = numext::real(src.coeff(row, col)); 242 dst.coeffRef(row, col) = numext::real(src.coeff(row, col));
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TriangularMatrix.h | 317 bool isApprox(const TriangularView<OtherMatrixType, Mode>& other, typename NumTraits<Scalar>::Real precision = NumTraits<Scalar>::dummy_precision()) const 322 bool isApprox(const MatrixBase<OtherDerived>& other, typename NumTraits<Scalar>::Real precision = NumTraits<Scalar>::dummy_precision()) const
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/external/eigen/Eigen/src/Eigenvalues/ |
ComplexSchur.h | 28 * \brief Performs a complex Schur decomposition of a real or complex square matrix 34 * Given a real or complex square matrix A, this class computes the 65 typedef typename NumTraits<Scalar>::Real RealScalar; 70 * This is \c std::complex<Scalar> if #Scalar is real (e.g., 285 return abs(numext::real(m_matT.coeff(iu,iu-1))) + abs(numext::real(m_matT.coeff(iu-1,iu-2)));
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Tridiagonalization.h | 41 * \f$ A = Q T Q^* \f$ where \f$ Q \f$ is unitary and \f$ T \f$ a real symmetric tridiagonal matrix. 69 typedef typename NumTraits<Scalar>::Real RealScalar; 197 * - the diagonal and lower sub-diagonal represent the real tridiagonal 266 return MatrixTReturnType(m_matrix.real()); 400 * such that \f$ mat = Q T Q^* \f$ where \f$ Q \f$ is unitary and \f$ T \f$ a real 447 diag = mat.diagonal().real(); 448 subdiag = mat.template diagonal<-1>().real(); 457 * Specialization for 3x3 real matrices. 513 diag(0,0) = numext::real(mat(0,0));
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EigenSolver.h | 27 * class template. Currently, only real matrices are supported. 37 * matrix is real. However, we can choose real matrices \f$ V \f$ and \f$ D 42 * (where \f$ u \f$ and \f$ v \f$ are real numbers) on the diagonal. These 81 typedef typename NumTraits<Scalar>::Real RealScalar; 86 * This is \c std::complex<Scalar> if #Scalar is real (e.g., 189 * The real matrix \f$ V \f$ returned by this function and the 213 * The matrix \f$ D \f$ returned by this function is real and 257 * This function computes the eigenvalues of the real matrix \p matrix. 262 * The matrix is first reduced to real Schur form using the RealSchu [all...] |
/external/eigen/Eigen/src/Geometry/ |
AlignedBox.h | 36 typedef typename ScalarTraits::Real RealScalar;
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/external/eigen/test/ |
basicstuff.cpp | 96 m3.real() = m1.real(); 97 VERIFY_IS_APPROX(static_cast<const MatrixType&>(m3).real(), static_cast<const MatrixType&>(m1).real()); 98 VERIFY_IS_APPROX(static_cast<const MatrixType&>(m3).real(), m1.real()); 135 typedef typename NumTraits<Scalar>::Real RealScalar; 144 VERIFY(numext::real(s1)==numext::real_ref(s1)); 146 numext::real_ref(s1) = numext::real(s2); 154 cm.real() = rm1 [all...] |
cwiseop.cpp | 36 typedef typename NumTraits<Scalar>::Real RealScalar;
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vectorwiseop.cpp | 120 typedef typename NumTraits<Scalar>::Real RealScalar;
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redux.cpp | 29 Scalar s(0), p(1), minc(numext::real(m1.coeff(0))), maxc(numext::real(m1.coeff(0))); 35 minc = (std::min)(numext::real(minc), numext::real(m1(i,j))); 36 maxc = (std::max)(numext::real(maxc), numext::real(m1(i,j))); 43 VERIFY_IS_APPROX(m1.real().minCoeff(), numext::real(minc)); 44 VERIFY_IS_APPROX(m1.real().maxCoeff(), numext::real(maxc)) [all...] |
/external/eigen/test/eigen2/ |
eigen2_cwiseop.cpp | 25 typedef typename NumTraits<Scalar>::Real RealScalar;
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/external/eigen/unsupported/Eigen/src/Skyline/ |
SkylineInplaceLU.h | 30 typedef typename NumTraits<typename MatrixType::Scalar>::Real RealScalar;
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/external/ceres-solver/include/ceres/ |
jet.h | 39 // numbers are extensions of the real numbers analogous to complex numbers: 42 // that e^2 = 0. Dual numbers have two components: the "real" component and the 644 typedef ceres::Jet<T, N> Real; 652 static inline Real epsilon() { return Real(std::numeric_limits<T>::epsilon()); }
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/external/chromium_org/content/browser/ |
plugin_browsertest.cc | 459 IN_PROC_BROWSER_TEST_F(PluginTest, MAYBE(Real)) { 460 TestPlugin("real.html");
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/external/eigen/Eigen/src/Core/util/ |
ForwardDeclarations.h | 280 typedef std::complex<typename NumTraits<Scalar>::Real> ComplexScalar;
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/external/eigen/Eigen/src/Eigen2Support/Geometry/ |
Quaternion.h | 104 * \warning Note the order of the arguments: the real \a w coefficient first, 199 bool isApprox(const Quaternion& other, typename NumTraits<Scalar>::Real prec = precision<Scalar>()) const
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/external/eigen/Eigen/src/IterativeLinearSolvers/ |
IncompleteLUT.h | 99 typedef typename NumTraits<Scalar>::Real RealScalar; 252 Vector u(n) ; // real values of the row -- maximum size is n --
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/external/eigen/Eigen/src/LU/ |
PartialPivLU.h | 60 typedef typename NumTraits<typename MatrixType::Scalar>::Real RealScalar;
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/external/eigen/Eigen/src/SparseCore/ |
SparseMatrixBase.h | 112 /** This is the "real scalar" type; if the \a Scalar type is already real numbers 118 typedef typename NumTraits<Scalar>::Real RealScalar;
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/external/eigen/bench/spbench/ |
spbenchsolver.h | 85 template<typename T> inline typename NumTraits<T>::Real test_precision() { return NumTraits<T>::dummy_precision(); }
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/prebuilts/python/darwin-x86/2.7.5/lib/python2.7/ |
fractions.py | 4 """Rational, infinite-precision, real numbers.""" 217 # Algorithm notes: For any real number x, define a *best upper 316 elif isinstance(other, Real): 342 handle those instances before delegating to Real or 376 elif isinstance(a, numbers.Real): 533 b = b.real
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/prebuilts/python/linux-x86/2.7.5/lib/python2.7/ |
fractions.py | 4 """Rational, infinite-precision, real numbers.""" 217 # Algorithm notes: For any real number x, define a *best upper 316 elif isinstance(other, Real): 342 handle those instances before delegating to Real or 376 elif isinstance(a, numbers.Real): 533 b = b.real
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