| /external/ceres-solver/examples/ |
| pgm_image.h | 49 template<typename Real>
65 Real* MutablePixel(int x, int y);
66 Real Pixel(int x, int y) const;
67 Real* MutablePixelFromLinearIndex(int index);
68 Real PixelFromLinearIndex(int index) const;
74 void operator+=(Real a);
76 void operator*=(Real a);
83 bool SetData(const std::vector<Real>& new_data);
84 const std::vector<Real>& data() const;
88 std::vector<Real> data_
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| /external/clang/test/SemaTemplate/ |
| qualified-names-diag.cpp | 8 typedef float Real;
14 vector<Real> v2;
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| /external/eigen/Eigen/src/Core/ |
| NumTraits.h | 25 * \li A typedef \a Real, giving the "real part" type of \a T. If \a T is already real,
26 * then \a Real is just a typedef to \a T. If \a T is \c std::complex<U> then \a Real
45 * \li An epsilon() function which, unlike std::numeric_limits::epsilon(), returns a \a Real instead of a \a T.
63 typedef T Real;
71 static inline Real epsilon() { return std::numeric_limits<T>::epsilon(); }
72 static inline Real dummy_precision()
75 return Real(0)
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| Dot.h | 113 EIGEN_STRONG_INLINE typename NumTraits<typename internal::traits<Derived>::Scalar>::Real MatrixBase<Derived>::squaredNorm() const
115 return internal::real((*this).cwiseAbs2().sum());
125 inline typename NumTraits<typename internal::traits<Derived>::Scalar>::Real MatrixBase<Derived>::norm() const
165 typedef typename NumTraits<typename traits<Derived>::Scalar>::Real RealScalar;
175 static inline typename NumTraits<typename traits<Derived>::Scalar>::Real run(const MatrixBase<Derived>& m)
184 static inline typename NumTraits<typename traits<Derived>::Scalar>::Real run(const MatrixBase<Derived>& m)
193 static inline typename NumTraits<typename traits<Derived>::Scalar>::Real run(const MatrixBase<Derived>& m)
209 inline typename NumTraits<typename internal::traits<Derived>::Scalar>::Real
235 * type is real numbers, a unitary matrix is an orthogonal matrix, whence the name.
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| MathFunctions.h | 59 * Implementation of real *
65 typedef typename NumTraits<Scalar>::Real RealScalar;
77 using std::real;
78 return real(x);
85 typedef typename NumTraits<Scalar>::Real type;
89 inline EIGEN_MATHFUNC_RETVAL(real, Scalar) real(const Scalar& x) function in namespace:Eigen::internal
91 return EIGEN_MATHFUNC_IMPL(real, Scalar)::run(x);
101 typedef typename NumTraits<Scalar>::Real RealScalar;
121 typedef typename NumTraits<Scalar>::Real type
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| /external/eigen/unsupported/Eigen/src/Polynomials/ |
| PolynomialUtils.h | 48 typedef typename NumTraits<T>::Real Real;
50 if( internal::abs2( x ) <= Real(1) ){
75 typename NumTraits<typename Polynomial::Scalar>::Real cauchy_max_bound( const Polynomial& poly )
78 typedef typename NumTraits<Scalar>::Real Real;
82 Real cb(0);
86 return cb + Real(1);
97 typename NumTraits<typename Polynomial::Scalar>::Real cauchy_min_bound( const Polynomial& poly )
100 typedef typename NumTraits<Scalar>::Real Real
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| /external/eigen/Eigen/src/Eigen2Support/ |
| MathFunctions.h | 15 template<typename T> inline typename NumTraits<T>::Real ei_real(const T& x) { return internal::real(x); }
16 template<typename T> inline typename NumTraits<T>::Real ei_imag(const T& x) { return internal::imag(x); }
18 template<typename T> inline typename NumTraits<T>::Real ei_abs (const T& x) { return internal::abs(x); }
19 template<typename T> inline typename NumTraits<T>::Real ei_abs2(const T& x) { return internal::abs2(x); }
36 typename NumTraits<Scalar>::Real precision = NumTraits<Scalar>::dummy_precision())
43 typename NumTraits<Scalar>::Real precision = NumTraits<Scalar>::dummy_precision())
50 typename NumTraits<Scalar>::Real precision = NumTraits<Scalar>::dummy_precision())
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| /external/chromium_org/native_client_sdk/src/libraries/nacl_io/ |
| real_pepper_interface.cc | 15 class Real##BaseClass : public BaseClass { \
17 explicit Real##BaseClass(const PPInterface* interface);
38 Real##BaseClass::Real##BaseClass(const PPInterface* interface) \
44 ReturnType Real##BaseClass::MethodName(Type0 arg0) { \
48 ReturnType Real##BaseClass::MethodName(Type0 arg0, Type1 arg1) { \
52 ReturnType Real##BaseClass::MethodName(Type0 arg0, Type1 arg1, \
57 ReturnType Real##BaseClass::MethodName(Type0 arg0, Type1 arg1, Type2 arg2, \
63 ReturnType Real##BaseClass::MethodName(Type0 arg0, Type1 arg1, Type2 arg2, \
87 BaseClass##interface_ = new Real##BaseClass(
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| real_pepper_interface.h | 20 class Real##BaseClass;
53 Real##BaseClass* BaseClass##interface_;
|
| /prebuilts/python/darwin-x86/2.7.5/lib/python2.7/test/ |
| test_abstract_numbers.py | 5 from numbers import Complex, Real, Rational, Integral
13 self.assertEqual(7, int(7).real)
23 self.assertEqual(7, long(7).real)
31 self.assertTrue(issubclass(float, Real))
33 self.assertEqual(7.3, float(7.3).real)
38 self.assertFalse(issubclass(complex, Real))
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| /prebuilts/python/linux-x86/2.7.5/lib/python2.7/test/ |
| test_abstract_numbers.py | 5 from numbers import Complex, Real, Rational, Integral
13 self.assertEqual(7, int(7).real)
23 self.assertEqual(7, long(7).real)
31 self.assertTrue(issubclass(float, Real))
33 self.assertEqual(7.3, float(7.3).real)
38 self.assertFalse(issubclass(complex, Real))
|
| /external/eigen/Eigen/src/SparseCore/ |
| SparseView.h | 39 typename NumTraits<Scalar>::Real m_epsilon = NumTraits<Scalar>::dummy_precision()) :
53 typename NumTraits<Scalar>::Real m_epsilon;
91 typename NumTraits<Scalar>::Real m_epsilon) const
|
| SparseDot.h | 79 inline typename NumTraits<typename internal::traits<Derived>::Scalar>::Real
82 return internal::real((*this).cwiseAbs2().sum());
86 inline typename NumTraits<typename internal::traits<Derived>::Scalar>::Real
|
| /external/eigen/demos/mandelbrot/ |
| mandelbrot.cpp | 31 template<typename Real> void MandelbrotThread::render(int img_width, int img_height)
33 enum { packetSize = Eigen::internal::packet_traits<Real>::size }; // number of reals in a Packet
34 typedef Eigen::Array<Real, packetSize, 1> Packet; // wrap a Packet as a vector
36 enum { iters_before_test = iters_before_test<Real>::ret };
43 typedef Eigen::Array<Real, 2, 1> Vector2;
53 // starting with z = c = complex coord of the pixel. pzi and pzr denote the real and imaginary parts of z.
54 // pci and pcr denote the real and imaginary parts of c.
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| mandelbrot.h | 31 template<typename Real> void render(int img_width, int img_height);
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| /external/eigen/unsupported/Eigen/src/AutoDiff/ |
| AutoDiffScalar.h | 51 * - internal::conj, internal::real, internal::imag, internal::abs2.
63 typename NumTraits<typename internal::traits<typename internal::remove_all<_DerType>::type>::Scalar>::Real>::value>
68 typename NumTraits<typename internal::traits<typename internal::remove_all<_DerType>::type>::Scalar>::Real>::value> Base;
71 typedef typename NumTraits<Scalar>::Real Real;
89 /*explicit*/ AutoDiffScalar(const Real& value)
170 // inline const AutoDiffScalar<DerType&> operator+(const Real& other) const
175 // friend inline const AutoDiffScalar<DerType&> operator+(const Real& a, const AutoDiffScalar& b)
264 // inline const AutoDiffScalar<typename CwiseUnaryOp<internal::scalar_multiple_op<Real>, DerType>::Type >
265 // operator*(const Real& other) cons
523 inline const AutoDiffScalar<DerType>& real(const AutoDiffScalar<DerType>& x) { return x; } function in namespace:Eigen
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| /external/eigen/test/ |
| eigensolver_complex.cpp | 21 typedef typename NumTraits<typename VectorType::Scalar>::Real RealScalar;
43 typedef typename NumTraits<Scalar>::Real RealScalar;
46 typedef typename std::complex<typename NumTraits<typename MatrixType::Scalar>::Real> Complex;
58 // Note: If MatrixType is real then a.eigenvalues() uses EigenSolver and thus
|
| selfadjoint.cpp | 19 typedef typename NumTraits<Scalar>::Real RealScalar;
27 m1.diagonal() = m1.diagonal().real().template cast<Scalar>();
|
| /external/clang/include/clang/AST/ |
| APValue.h | 72 APSInt Real, Imag;
73 ComplexAPSInt() : Real(1), Imag(1) {}
76 APFloat Real, Imag;
77 ComplexAPFloat() : Real(0.0), Imag(0.0) {}
219 return ((ComplexAPSInt*)(char*)Data)->Real;
235 return ((ComplexAPFloat*)(char*)Data)->Real;
367 ((ComplexAPSInt*)(char*)Data)->Real = R;
374 ((ComplexAPFloat*)(char*)Data)->Real = R;
|
| /external/eigen/Eigen/src/Eigen2Support/Geometry/ |
| ParametrizedLine.h | 35 typedef typename NumTraits<Scalar>::Real RealScalar;
112 bool isApprox(const ParametrizedLine& other, typename NumTraits<Scalar>::Real prec = precision<Scalar>()) const
|
| /external/eigen/test/eigen2/ |
| eigen2_prec_inverse_4x4.cpp | 24 template<typename T> inline typename NumTraits<T>::Real epsilon()
26 return std::numeric_limits<typename NumTraits<T>::Real>::epsilon();
|
| eigen2_eigensolver.cpp | 26 typedef typename NumTraits<Scalar>::Real RealScalar;
29 typedef typename std::complex<typename NumTraits<typename MatrixType::Scalar>::Real> Complex;
109 typedef typename NumTraits<Scalar>::Real RealScalar;
112 typedef typename std::complex<typename NumTraits<typename MatrixType::Scalar>::Real> Complex;
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| eigen2_inverse.cpp | 23 typedef typename NumTraits<Scalar>::Real RealScalar;
|
| /external/eigen/unsupported/test/ |
| polynomialsolver.cpp | 107 typedef typename REAL_ROOTS::Scalar Real;
114 std::vector< Real > calc_realRoots;
141 Real r = psolve.absGreatestRealRoot( hasRealRoot );
191 typename NumTraits<_Scalar>::Real
|
| /ndk/tests/device/issue42891-boost-1_52/jni/boost/boost/math/policies/ |
| policy.hpp | 204 real, enumerator in enum:boost::math::policies::discrete_quantile_policy_type
709 template <class Real, class Policy>
712 typedef Real type;
729 template <class Real>
738 template <class Real, class Policy>
741 BOOST_STATIC_ASSERT( ::std::numeric_limits<Real>::radix == 2);
743 typedef basic_digits<Real> digits_t;
751 digits2< ::std::numeric_limits<Real>::digits>,
776 template <class Real, class Policy>
779 BOOST_STATIC_ASSERT((::std::numeric_limits<Real>::radix == 2) || ((::std::numeric_limits<Real>::is_specialized == 0) || (::std::numeric_limits<Rea (…)
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