| /external/eigen/doc/snippets/ |
| MatrixBase_computeInverseAndDetWithCheck.cpp | 5 double determinant; variable
6 m.computeInverseAndDetWithCheck(inverse,determinant,invertible);
7 cout << "Its determinant is " << determinant << endl;
|
| /external/eigen/test/ |
| determinant.cpp | 14 template<typename MatrixType> void determinant(const MatrixType& m) function
17 Determinant.h
27 VERIFY_IS_APPROX(MatrixType::Identity(size, size).determinant(), Scalar(1));
28 VERIFY_IS_APPROX((m1*m2).eval().determinant(), m1.determinant() * m2.determinant());
37 VERIFY_IS_APPROX(m2.determinant(), -m1.determinant());
40 VERIFY_IS_APPROX(m2.determinant(), -m1.determinant());
[all...] |
| inverse.cpp | 54 VERIFY_IS_APPROX(det, m1.determinant());
66 VERIFY_IS_MUCH_SMALLER_THAN(internal::abs(det-m3.determinant()), RealScalar(1));
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| dontalign.cpp | 40 VERIFY(square.determinant() != Scalar(0));
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| /external/eigen/test/eigen2/ |
| eigen2_determinant.cpp | 14 template<typename MatrixType> void determinant(const MatrixType& m) function
17 Determinant.h
26 VERIFY_IS_APPROX(MatrixType::Identity(size, size).determinant(), Scalar(1));
27 VERIFY_IS_APPROX((m1*m2).determinant(), m1.determinant() * m2.determinant());
36 VERIFY_IS_APPROX(m2.determinant(), -m1.determinant());
39 VERIFY_IS_APPROX(m2.determinant(), -m1.determinant());
[all...] |
| eigen2_sparse_solvers.cpp | 150 Scalar refDet = refLu.determinant();
164 // std::cerr << refDet << " == " << slu.determinant() << "\n";
166 VERIFY_IS_APPROX(refDet,slu.determinant()); // FIXME det is not very stable for complex
182 VERIFY_IS_APPROX(refDet,slu.determinant());
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| eigen2_inverse.cpp | 31 while(ei_abs(m1.determinant()) < RealScalar(0.1) && rows <= 8)
|
| /external/eigen/doc/examples/ |
| TutorialLinAlgInverseDeterminant.cpp | 14 cout << "The determinant of A is " << A.determinant() << endl;
|
| /external/eigen/Eigen/ |
| LU | 9 * This module includes %LU decomposition and related notions such as matrix inversion and determinant.
12 * - MatrixBase::determinant()
27 #include "src/LU/Determinant.h"
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| /external/eigen/Eigen/src/LU/ |
| Inverse.h | 54 typename ResultType::Scalar& determinant,
58 determinant = matrix.coeff(0,0);
59 invertible = abs(determinant) > absDeterminantThreshold;
60 if(invertible) result.coeffRef(0,0) = typename ResultType::Scalar(1) / determinant;
85 const Scalar invdet = typename MatrixType::Scalar(1) / matrix.determinant();
97 typename ResultType::Scalar& determinant,
102 determinant = matrix.determinant();
103 invertible = abs(determinant) > absDeterminantThreshold;
105 const Scalar invdet = Scalar(1) / determinant;
360 (derived(), absDeterminantThreshold, inverse, determinant, invertible); local
388 RealScalar determinant; local
[all...] |
| Determinant.h | 41 return m.partialPivLu().determinant();
89 * \returns the determinant of this matrix
92 inline typename internal::traits<Derived>::Scalar MatrixBase<Derived>::determinant() const function in class:Eigen::MatrixBase
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| /external/chromium_org/ui/gfx/ |
| matrix3_f.cc | 33 // This routine is separated from the Matrix3F::Determinant because in
103 double determinant = Determinant3x3(data_); local
104 if (std::numeric_limits<float>::epsilon() > std::abs(determinant))
108 (data_[M11] * data_[M22] - data_[M12] * data_[M21]) / determinant,
109 (data_[M02] * data_[M21] - data_[M01] * data_[M22]) / determinant,
110 (data_[M01] * data_[M12] - data_[M02] * data_[M11]) / determinant,
111 (data_[M12] * data_[M20] - data_[M10] * data_[M22]) / determinant,
112 (data_[M00] * data_[M22] - data_[M02] * data_[M20]) / determinant,
113 (data_[M02] * data_[M10] - data_[M00] * data_[M12]) / determinant,
114 (data_[M10] * data_[M21] - data_[M11] * data_[M20]) / determinant,
[all...] |
| matrix3_unittest.cc | 47 TEST(Matrix3fTest, Determinant) {
48 EXPECT_EQ(1.0f, Matrix3F::Identity().Determinant());
49 EXPECT_EQ(0.0f, Matrix3F::Zeros().Determinant());
50 EXPECT_EQ(0.0f, Matrix3F::Ones().Determinant());
55 EXPECT_EQ(390.0f, matrix.Determinant());
59 EXPECT_EQ(0, matrix.Determinant());
64 EXPECT_NEAR(0.3149f, matrix.Determinant(), 0.0001f);
76 EXPECT_EQ(0, singular.Determinant());
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| matrix3_f.h | 66 // Value of the determinant of the matrix.
67 float Determinant() const;
|
| /external/chromium_org/chrome/third_party/chromevox/chromevox/background/mathmaps/functions/ |
| algebra.json | 14 "default": "determinant",
|
| /external/eigen/Eigen/src/QR/ |
| HouseholderQR.h | 133 /** \returns the absolute value of the determinant of the matrix of which
140 * \warning a determinant can be very big or small, so for matrices
144 * \sa logAbsDeterminant(), MatrixBase::determinant()
148 /** \returns the natural log of the absolute value of the determinant of the matrix of which
156 * to determinant computation.
158 * \sa absDeterminant(), MatrixBase::determinant()
177 eigen_assert(m_qr.rows() == m_qr.cols() && "You can't take the determinant of a non-square matrix!");
185 eigen_assert(m_qr.rows() == m_qr.cols() && "You can't take the determinant of a non-square matrix!");
|
| /external/chromium_org/third_party/WebKit/Source/platform/geometry/ |
| FloatPolygon.cpp | 37 static inline float determinant(const FloatSize& a, const FloatSize& b) function in namespace:WebCore
44 return !determinant(p1 - p0, p2 - p0);
104 bool clockwise = determinant(vertexAt(minVertexIndex) - prevVertex, nextVertex - prevVertex) > 0;
235 float denominator = determinant(thisDelta, otherDelta);
244 float uThisLine = determinant(otherDelta, vertex1Delta) / denominator;
245 float uOtherLine = determinant(thisDelta, vertex1Delta) / denominator;
|
| FloatQuad.cpp | 56 inline float determinant(const FloatSize& a, const FloatSize& b) function in namespace:WebCore
161 if (determinant(v1, p - m_p1) < 0)
165 if (determinant(v2, p - m_p2) < 0)
169 if (determinant(v3, p - m_p3) < 0)
173 if (determinant(v4, p - m_p4) < 0)
233 return determinant(m_p2 - m_p1, m_p3 - m_p2) < 0;
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| /external/eigen/doc/ |
| C06_TutorialLinearAlgebra.dox | 158 \section TutorialLinAlgInverse Computing inverse and determinant
160 First of all, make sure that you really want this. While inverse and determinant are fundamental mathematical concepts,
162 advantageously replaced by solve() operations, and the determinant is often \em not a good way of checking if a matrix
165 However, for \em very \em small matrices, the above is not true, and inverse and determinant can be very useful.
167 While certain decompositions, such as PartialPivLU and FullPivLU, offer inverse() and determinant() methods, you can also
168 call inverse() and determinant() directly on a matrix. If your matrix is of a very small fixed size (at most 4x4) this
|
| /external/chromium_org/third_party/WebKit/Source/platform/transforms/ |
| AffineTransform.cpp | 93 double determinant = det(); local
94 if (determinant == 0.0)
104 result.m_transform[0] = m_transform[3] / determinant;
105 result.m_transform[1] = -m_transform[1] / determinant;
106 result.m_transform[2] = -m_transform[2] / determinant;
107 result.m_transform[3] = m_transform[0] / determinant;
109 - m_transform[3] * m_transform[4]) / determinant;
111 - m_transform[0] * m_transform[5]) / determinant;
|
| /external/llvm/test/Transforms/InstCombine/ |
| 2006-12-08-Phi-ICmp-Op-Fold.ll | 33 %tmp13 = call i32 @determinant( i64 %tmp.upgrd.3, i64 %tmp9, i64 %tmp12 ) ; <i32> [#uses=2]
51 declare i32 @determinant(i64, i64, i64)
|
| 2006-12-08-Select-ICmp.ll | 32 %tmp13 = call i32 @determinant( i64 %tmp.upgrd.3, i64 %tmp9, i64 %tmp12 ) ; <i32> [#uses=2]
40 declare i32 @determinant(i64, i64, i64)
|
| /external/chromium-trace/trace-viewer/third_party/gl-matrix/src/gl-matrix/ |
| mat2.js | 120 // Calculate the determinant
155 * Calculates the determinant of a mat2
158 * @returns {Number} determinant of a
160 mat2.determinant = function (a) {
|
| /packages/apps/Camera/jni/feature_mos/src/mosaic/ |
| trsMatrix.h | 25 // Calculate the determinant of a matrix
|
| /packages/apps/Camera2/jni/feature_mos/src/mosaic/ |
| trsMatrix.h | 25 // Calculate the determinant of a matrix
|
