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Quelle TensorFFT.h Sprache: C |
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// This file is part of Eigen, a lightweight C++ template library // for linear algebra. // // Copyright (C) 2015 Jianwei Cui <thucjw@gmail.com> // // This Source Code Form is subject to the terms of the Mozilla // Public License v. 2.0. If a copy of the MPL was not distributed // with this file, You can obtain one at http://mozilla.org/MPL/2.0/. #ifndef EIGEN_CXX11_TENSOR_TENSOR_FFT_H #define EIGEN_CXX11_TENSOR_TENSOR_FFT_H namespace Eigen { /** \class TensorFFT * \ingroup CXX11_Tensor_Module * * \brief Tensor FFT class. * * TODO: * Vectorize the Cooley Tukey and the Bluestein algorithm * Add support for multithreaded evaluation * Improve the performance on GPU */ template <bool NeedUprade> struct MakeComplex { template <typename T> EIGEN_DEVICE_FUNC T operator() (const T& val) const { return val; } }; template <> struct MakeComplex<true> { template <typename T> EIGEN_DEVICE_FUNC std::complex<T> operator() (const T& val) const { return std::complex<T>(val, 0); } }; template <> struct MakeComplex<false> { template <typename T> EIGEN_DEVICE_FUNC std::complex<T> operator() (const std::complex<T>& val) const { return val; } }; template <int ResultType> struct PartOf { template <typename T> T operator() (const T& val) const { return val; } }; template <> struct PartOf<RealPart> { template <typename T> T operator() (const std::complex<T>& val) const { return val.real(); } }; template <> struct PartOf<ImagPart> { template <typename T> T operator() (const std::complex<T>& val) const { return val.imag(); } }; namespace internal { template <typename FFT, typename XprType, int FFTResultType, int FFTDir> struct traits<TensorFFTOp<FFT, XprType, FFTResultType, FFTDir> > : public traits<XprType> { typedef traits<XprType> XprTraits; typedef typename NumTraits<typename XprTraits::Scalar>::Real RealScalar; typedef typename std::complex<RealScalar> ComplexScalar; typedef typename XprTraits::Scalar InputScalar; typedef typename conditional<FFTResultType == RealPart || FFTResultType == ImagPart, RealS typedef typename XprTraits::StorageKind StorageKind; typedef typename XprTraits::Index Index; typedef typename XprType::Nested Nested; typedef typename remove_reference<Nested>::type _Nested; static const int NumDimensions = XprTraits::NumDimensions; static const int Layout = XprTraits::Layout; typedef typename traits<XprType>::PointerType PointerType; }; template <typename FFT, typename XprType, int FFTResultType, int FFTDirection> struct eval<TensorFFTOp<FFT, XprType, FFTResultType, FFTDirection>, Eigen::Dense> { typedef const TensorFFTOp<FFT, XprType, FFTResultType, FFTDirection>& type; }; template <typename FFT, typename XprType, int FFTResultType, int FFTDirection> struct nested<TensorFFTOp<FFT, XprType, FFTResultType, FFTDirection>, 1, typename eval<Tens typedef TensorFFTOp<FFT, XprType, FFTResultType, FFTDirection> type; }; } // end namespace internal template <typename FFT, typename XprType, int FFTResultType, int FFTDir> class TensorFFTOp : public TensorBase<TensorFFTOp<FFT, XprType, FFTResultType, FFTDir>, Rea public: typedef typename Eigen::internal::traits<TensorFFTOp>::Scalar Scalar; typedef typename Eigen::NumTraits<Scalar>::Real RealScalar; typedef typename std::complex<RealScalar> ComplexScalar; typedef typename internal::conditional<FFTResultType == RealPart || FFTResultType == Imag typedef OutputScalar CoeffReturnType; typedef typename Eigen::internal::nested<TensorFFTOp>::type Nested; typedef typename Eigen::internal::traits<TensorFFTOp>::StorageKind StorageKind; typedef typename Eigen::internal::traits<TensorFFTOp>::Index Index; EIGEN_DEVICE_FUNC EIGEN_STRONG_INLINE TensorFFTOp(const XprType& expr, const FFT&&nb : m_xpr(expr), m_fft(fft) {} EIGEN_DEVICE_FUNC const FFT& fft() const { return m_fft; } EIGEN_DEVICE_FUNC const typename internal::remove_all<typename XprType::Nested>::type& expression() c return m_xpr; } protected: typename XprType::Nested m_xpr; const FFT m_fft; }; // Eval as rvalue template <typename FFT, typename ArgType, typename Device, int FFTResultType, int FFTDir> struct TensorEvaluator<const TensorFFTOp<FFT, ArgType, FFTResultType, FFTDir>, Device> { typedef TensorFFTOp<FFT, ArgType, FFTResultType, FFTDir> XprType; typedef typename XprType::Index Index; static const int NumDims = internal::array_size<typename TensorEvaluator<ArgType, Device>: typedef DSizes<Index, NumDims> Dimensions; typedef typename XprType::Scalar Scalar; typedef typename Eigen::NumTraits<Scalar>::Real RealScalar; typedef typename std::complex<RealScalar> ComplexScalar; typedef typename TensorEvaluator<ArgType, Device>::Dimensions InputDimensions; typedef internal::traits<XprType> XprTraits; typedef typename XprTraits::Scalar InputScalar; typedef typename internal::conditional<FFTResultType == RealPart || FFTResultType == Imag typedef OutputScalar CoeffReturnType; typedef typename PacketType<OutputScalar, Device>::type PacketReturnType; static const int PacketSize = internal::unpacket_traits<PacketReturnType>::size; typedef StorageMemory<CoeffReturnType, Device> Storage; typedef typename Storage::Type EvaluatorPointerType; enum { IsAligned = false, PacketAccess = true, BlockAccess = false, PreferBlockAccess = false, Layout = TensorEvaluator<ArgType, Device>::Layout, CoordAccess = false, RawAccess = false }; //===- Tensor block evaluation strategy (see TensorBlock.h) -------------===// typedef internal::TensorBlockNotImplemented TensorBlock; //===--------------------------------------------------------------------===// EIGEN_STRONG_INLINE TensorEvaluator(const XprType& op, const Device& device) : m const typename TensorEvaluator<ArgType, Device>::Dimensions& input_dims = m_impl.dim for (int i = 0; i < NumDims; ++i) { eigen_assert(input_dims[i] > 0); m_dimensions[i] = input_dims[i]; } if (static_cast<int>(Layout) == static_cast<int>(ColMajor)) { m_strides[0] = 1; for (int i = 1; i < NumDims; ++i) { m_strides[i] = m_strides[i - 1] * m_dimensions[i - 1]; } } else { m_strides[NumDims - 1] = 1; for (int i = NumDims - 2; i >= 0; --i) { m_strides[i] = m_strides[i + 1] * m_dimensions[i + 1]; } } m_size = m_dimensions.TotalSize(); } EIGEN_DEVICE_FUNC EIGEN_STRONG_INLINE const Dimensions& dimensions() const { return m_dimensions; } EIGEN_STRONG_INLINE bool evalSubExprsIfNeeded(EvaluatorPointerType data) { m_impl.evalSubExprsIfNeeded(NULL); if (data) { evalToBuf(data); return false; } else { m_data = (EvaluatorPointerType)m_device.get((CoeffReturnType*)(m_device.allocate_t evalToBuf(m_data); return true; } } EIGEN_STRONG_INLINE void cleanup() { if (m_data) { m_device.deallocate(m_data); m_data = NULL; } m_impl.cleanup(); } EIGEN_DEVICE_FUNC EIGEN_ALWAYS_INLINE CoeffReturnType coeff(Index index) const { return m_data[index]; } template <int LoadMode> EIGEN_DEVICE_FUNC EIGEN_ALWAYS_INLINE PacketReturnType packet(Index index) const { return internal::ploadt<PacketReturnType, LoadMode>(m_data + index); } EIGEN_DEVICE_FUNC EIGEN_STRONG_INLINE TensorOpCost costPerCoeff(bool vectorized) const { return TensorOpCost(sizeof(CoeffReturnType), 0, 0, vectorized, PacketSize); } EIGEN_DEVICE_FUNC EvaluatorPointerType data() const { return m_data; } #ifdef EIGEN_USE_SYCL // binding placeholder accessors to a command group handler for SYCL EIGEN_DEVICE_FUNC EIGEN_STRONG_INLINE void bind(cl::sycl::handler &cgh) const { m_data.bind(cgh); } #endif private: EIGEN_DEVICE_FUNC EIGEN_STRONG_INLINE void evalToBuf(EvaluatorPointerType data) { const bool write_to_out = internal::is_same<OutputScalar, ComplexScalar>::value; ComplexScalar* buf = write_to_out ? (ComplexScalar*)data : (ComplexScalar*)m_device.all for (Index i = 0; i < m_size; ++i) { buf[i] = MakeComplex<internal::is_same<InputScalar, RealScalar>::value>()(m_impl.coeff( } for (size_t i = 0; i < m_fft.size(); ++i) { Index dim = m_fft[i]; eigen_assert(dim >= 0 && dim < NumDims); Index line_len = m_dimensions[dim]; eigen_assert(line_len >= 1); ComplexScalar* line_buf = (ComplexScalar*)m_device.allocate(sizeof(ComplexScalar) * l const bool is_power_of_two = isPowerOfTwo(line_len); const Index good_composite = is_power_of_two ? 0 : findGoodComposite(line_len); const Index log_len = is_power_of_two ? getLog2(line_len) : getLog2(good_composite); ComplexScalar* a = is_power_of_two ? NULL : (ComplexScalar*)m_device.allocate(sizeof(Co ComplexScalar* b = is_power_of_two ? NULL : (ComplexScalar*)m_device.allocate(sizeof(Co ComplexScalar* pos_j_base_powered = is_power_of_two ? NULL : (ComplexScalar*)m_device.a if (!is_power_of_two) { // Compute twiddle factors // t_n = exp(sqrt(-1) * pi * n^2 / line_len) // for n = 0, 1,..., line_len-1. // For n > 2 we use the recurrence t_n = t_{n-1}^2 / t_{n-2} * t_1^2 // The recurrence is correct in exact arithmetic, but causes // numerical issues for large transforms, especially in // single-precision floating point. // // pos_j_base_powered[0] = ComplexScalar(1, 0); // if (line_len > 1) { // const ComplexScalar pos_j_base = ComplexScalar( // numext::cos(M_PI / line_len), numext::sin(M_PI / line_len)); // pos_j_base_powered[1] = pos_j_base; // if (line_len > 2) { // const ComplexScalar pos_j_base_sq = pos_j_base * pos_j_base; // for (int i = 2; i < line_len + 1; ++i) { // pos_j_base_powered[i] = pos_j_base_powered[i - 1] * // pos_j_base_powered[i - 1] / // pos_j_base_powered[i - 2] * // pos_j_base_sq; // } // } // } // TODO(rmlarsen): Find a way to use Eigen's vectorized sin // and cosine functions here. for (int j = 0; j < line_len + 1; ++j) { double arg = ((EIGEN_PI * j) * j) / line_len; std::complex<double> tmp(numext::cos(arg), numext::sin(arg)); pos_j_base_powered[j] = static_cast<ComplexScalar>(tmp); } } for (Index partial_index = 0; partial_index < m_size / line_len; ++partial_index) { const Index base_offset = getBaseOffsetFromIndex(partial_index, dim); // get data into line_buf const Index stride = m_strides[dim]; if (stride == 1) { m_device.memcpy(line_buf, &buf[base_offset], line_len*sizeof(ComplexScalar)); } else { Index offset = base_offset; for (int j = 0; j < line_len; ++j, offset += stride) { line_buf[j] = buf[offset]; } } // process the line if (is_power_of_two) { processDataLineCooleyTukey(line_buf, line_len, log_len); } else { processDataLineBluestein(line_buf, line_len, good_composite, log_len, a, b, pos_j_base } // write back if (FFTDir == FFT_FORWARD && stride == 1) { m_device.memcpy(&buf[base_offset], line_buf, line_len*sizeof(ComplexScalar)); } else { Index offset = base_offset; const ComplexScalar div_factor = ComplexScalar(1.0 / line_len, 0); for (int j = 0; j < line_len; ++j, offset += stride) { buf[offset] = (FFTDir == FFT_FORWARD) ? line_buf[j] : line_buf[j] * div_factor; } } } m_device.deallocate(line_buf); if (!is_power_of_two) { m_device.deallocate(a); m_device.deallocate(b); m_device.deallocate(pos_j_base_powered); } } if(!write_to_out) { for (Index i = 0; i < m_size; ++i) { data[i] = PartOf<FFTResultType>()(buf[i]); } m_device.deallocate(buf); } } EIGEN_DEVICE_FUNC EIGEN_STRONG_INLINE static bool isPowerOfTwo(Index x) { eigen_assert(x > 0); return !(x & (x - 1)); } // The composite number for padding, used in Bluestein's FFT algorithm EIGEN_DEVICE_FUNC EIGEN_STRONG_INLINE static Index findGoodComposite(Index n) { Index i = 2; while (i < 2 * n - 1) i *= 2; return i; } EIGEN_DEVICE_FUNC EIGEN_STRONG_INLINE static Index getLog2(Index m) { Index log2m = 0; while (m >>= 1) log2m++; return log2m; } // Call Cooley Tukey algorithm directly, data length must be power of 2 EIGEN_DEVICE_FUNC EIGEN_STRONG_INLINE void processDataLineCooleyTukey(ComplexScalar eigen_assert(isPowerOfTwo(line_len)); scramble_FFT(line_buf, line_len); compute_1D_Butterfly<FFTDir>(line_buf, line_len, log_len); } // Call Bluestein's FFT algorithm, m is a good composite number greater than (2 * n - 1), used as th EIGEN_DEVICE_FUNC EIGEN_STRONG_INLINE void processDataLineBluestein(ComplexScalar* l Index n = line_len; Index m = good_composite; ComplexScalar* data = line_buf; for (Index i = 0; i < n; ++i) { if(FFTDir == FFT_FORWARD) { a[i] = data[i] * numext::conj(pos_j_base_powered[i]); } else { a[i] = data[i] * pos_j_base_powered[i]; } } for (Index i = n; i < m; ++i) { a[i] = ComplexScalar(0, 0); } for (Index i = 0; i < n; ++i) { if(FFTDir == FFT_FORWARD) { b[i] = pos_j_base_powered[i]; } else { b[i] = numext::conj(pos_j_base_powered[i]); } } for (Index i = n; i < m - n; ++i) { b[i] = ComplexScalar(0, 0); } for (Index i = m - n; i < m; ++i) { if(FFTDir == FFT_FORWARD) { b[i] = pos_j_base_powered[m-i]; } else { b[i] = numext::conj(pos_j_base_powered[m-i]); } } scramble_FFT(a, m); compute_1D_Butterfly<FFT_FORWARD>(a, m, log_len); scramble_FFT(b, m); compute_1D_Butterfly<FFT_FORWARD>(b, m, log_len); for (Index i = 0; i < m; ++i) { a[i] *= b[i]; } scramble_FFT(a, m); compute_1D_Butterfly<FFT_REVERSE>(a, m, log_len); //Do the scaling after ifft for (Index i = 0; i < m; ++i) { a[i] /= m; } for (Index i = 0; i < n; ++i) { if(FFTDir == FFT_FORWARD) { data[i] = a[i] * numext::conj(pos_j_base_powered[i]); } else { data[i] = a[i] * pos_j_base_powered[i]; } } } EIGEN_DEVICE_FUNC EIGEN_STRONG_INLINE static void scramble_FFT(ComplexScalar* data, In eigen_assert(isPowerOfTwo(n)); Index j = 1; for (Index i = 1; i < n; ++i){ if (j > i) { std::swap(data[j-1], data[i-1]); } Index m = n >> 1; while (m >= 2 && j > m) { j -= m; m >>= 1; } j += m; } } template <int Dir> EIGEN_DEVICE_FUNC EIGEN_STRONG_INLINE void butterfly_2(ComplexScalar* data) { ComplexScalar tmp = data[1]; data[1] = data[0] - data[1]; data[0] += tmp; } template <int Dir> EIGEN_DEVICE_FUNC EIGEN_STRONG_INLINE void butterfly_4(ComplexScalar* data) { ComplexScalar tmp[4]; tmp[0] = data[0] + data[1]; tmp[1] = data[0] - data[1]; tmp[2] = data[2] + data[3]; if (Dir == FFT_FORWARD) { tmp[3] = ComplexScalar(0.0, -1.0) * (data[2] - data[3]); } else { tmp[3] = ComplexScalar(0.0, 1.0) * (data[2] - data[3]); } data[0] = tmp[0] + tmp[2]; data[1] = tmp[1] + tmp[3]; data[2] = tmp[0] - tmp[2]; data[3] = tmp[1] - tmp[3]; } template <int Dir> EIGEN_DEVICE_FUNC EIGEN_STRONG_INLINE void butterfly_8(ComplexScalar* data) { ComplexScalar tmp_1[8]; ComplexScalar tmp_2[8]; tmp_1[0] = data[0] + data[1]; tmp_1[1] = data[0] - data[1]; tmp_1[2] = data[2] + data[3]; if (Dir == FFT_FORWARD) { tmp_1[3] = (data[2] - data[3]) * ComplexScalar(0, -1); } else { tmp_1[3] = (data[2] - data[3]) * ComplexScalar(0, 1); } tmp_1[4] = data[4] + data[5]; tmp_1[5] = data[4] - data[5]; tmp_1[6] = data[6] + data[7]; if (Dir == FFT_FORWARD) { tmp_1[7] = (data[6] - data[7]) * ComplexScalar(0, -1); } else { tmp_1[7] = (data[6] - data[7]) * ComplexScalar(0, 1); } tmp_2[0] = tmp_1[0] + tmp_1[2]; tmp_2[1] = tmp_1[1] + tmp_1[3]; tmp_2[2] = tmp_1[0] - tmp_1[2]; tmp_2[3] = tmp_1[1] - tmp_1[3]; tmp_2[4] = tmp_1[4] + tmp_1[6]; // SQRT2DIV2 = sqrt(2)/2 #define SQRT2DIV2 0.7071067811865476 if (Dir == FFT_FORWARD) { tmp_2[5] = (tmp_1[5] + tmp_1[7]) * ComplexScalar(SQRT2DIV2, -SQRT2DIV2); tmp_2[6] = (tmp_1[4] - tmp_1[6]) * ComplexScalar(0, -1); tmp_2[7] = (tmp_1[5] - tmp_1[7]) * ComplexScalar(-SQRT2DIV2, -SQRT2DIV2); } else { tmp_2[5] = (tmp_1[5] + tmp_1[7]) * ComplexScalar(SQRT2DIV2, SQRT2DIV2); tmp_2[6] = (tmp_1[4] - tmp_1[6]) * ComplexScalar(0, 1); tmp_2[7] = (tmp_1[5] - tmp_1[7]) * ComplexScalar(-SQRT2DIV2, SQRT2DIV2); } data[0] = tmp_2[0] + tmp_2[4]; data[1] = tmp_2[1] + tmp_2[5]; data[2] = tmp_2[2] + tmp_2[6]; data[3] = tmp_2[3] + tmp_2[7]; data[4] = tmp_2[0] - tmp_2[4]; data[5] = tmp_2[1] - tmp_2[5]; data[6] = tmp_2[2] - tmp_2[6]; data[7] = tmp_2[3] - tmp_2[7]; } template <int Dir> EIGEN_DEVICE_FUNC EIGEN_STRONG_INLINE void butterfly_1D_merge( ComplexScalar* data, Index n, Index n_power_of_2) { // Original code: // RealScalar wtemp = std::sin(M_PI/n); // RealScalar wpi = -std::sin(2 * M_PI/n); const RealScalar wtemp = m_sin_PI_div_n_LUT[n_power_of_2]; const RealScalar wpi = (Dir == FFT_FORWARD) ? m_minus_sin_2_PI_div_n_LUT[n_power_of_2] : -m_minus_sin_2_PI_div_n_LUT[n_power_of_2]; const ComplexScalar wp(wtemp, wpi); const ComplexScalar wp_one = wp + ComplexScalar(1, 0); const ComplexScalar wp_one_2 = wp_one * wp_one; const ComplexScalar wp_one_3 = wp_one_2 * wp_one; const ComplexScalar wp_one_4 = wp_one_3 * wp_one; const Index n2 = n / 2; ComplexScalar w(1.0, 0.0); for (Index i = 0; i < n2; i += 4) { ComplexScalar temp0(data[i + n2] * w); ComplexScalar temp1(data[i + 1 + n2] * w * wp_one); ComplexScalar temp2(data[i + 2 + n2] * w * wp_one_2); ComplexScalar temp3(data[i + 3 + n2] * w * wp_one_3); w = w * wp_one_4; data[i + n2] = data[i] - temp0; data[i] += temp0; data[i + 1 + n2] = data[i + 1] - temp1; data[i + 1] += temp1; data[i + 2 + n2] = data[i + 2] - temp2; data[i + 2] += temp2; data[i + 3 + n2] = data[i + 3] - temp3; data[i + 3] += temp3; } } template <int Dir> EIGEN_DEVICE_FUNC EIGEN_STRONG_INLINE void compute_1D_Butterfly( ComplexScalar* data, Index n, Index n_power_of_2) { eigen_assert(isPowerOfTwo(n)); if (n > 8) { compute_1D_Butterfly<Dir>(data, n / 2, n_power_of_2 - 1); compute_1D_Butterfly<Dir>(data + n / 2, n / 2, n_power_of_2 - 1); butterfly_1D_merge<Dir>(data, n, n_power_of_2); } else if (n == 8) { butterfly_8<Dir>(data); } else if (n == 4) { butterfly_4<Dir>(data); } else if (n == 2) { butterfly_2<Dir>(data); } } EIGEN_DEVICE_FUNC EIGEN_STRONG_INLINE Index getBaseOffsetFromIndex(Index index, Index Index result = 0; if (static_cast<int>(Layout) == static_cast<int>(ColMajor)) { for (int i = NumDims - 1; i > omitted_dim; --i) { const Index partial_m_stride = m_strides[i] / m_dimensions[omitted_dim]; const Index idx = index / partial_m_stride; index -= idx * partial_m_stride; result += idx * m_strides[i]; } result += index; } else { for (Index i = 0; i < omitted_dim; ++i) { const Index partial_m_stride = m_strides[i] / m_dimensions[omitted_dim]; const Index idx = index / partial_m_stride; index -= idx * partial_m_stride; result += idx * m_strides[i]; } result += index; } // Value of index_coords[omitted_dim] is not determined to this step return result; } EIGEN_DEVICE_FUNC EIGEN_STRONG_INLINE Index getIndexFromOffset(Index base, Index omitt Index result = base + offset * m_strides[omitted_dim] ; return result; } protected: Index m_size; const FFT EIGEN_DEVICE_REF m_fft; Dimensions m_dimensions; array<Index, NumDims> m_strides; TensorEvaluator<ArgType, Device> m_impl; EvaluatorPointerType m_data; const Device EIGEN_DEVICE_REF m_device; // This will support a maximum FFT size of 2^32 for each dimension // m_sin_PI_div_n_LUT[i] = (-2) * std::sin(M_PI / std::pow(2,i)) ^ 2; const RealScalar m_sin_PI_div_n_LUT[32] = { RealScalar(0.0), RealScalar(-2), RealScalar(-0.999999999999999), RealScalar(-0.292893218813453), RealScalar(-0.0761204674887130), RealScalar(-0.0192147195967696), RealScalar(-0.00481527332780311), RealScalar(-0.00120454379482761), RealScalar(-3.01181303795779e-04), RealScalar(-7.52981608554592e-05), RealScalar(-1.88247173988574e-05), RealScalar(-4.70619042382852e-06), RealScalar(-1.17654829809007e-06), RealScalar(-2.94137117780840e-07), RealScalar(-7.35342821488550e-08), RealScalar(-1.83835707061916e-08), RealScalar(-4.59589268710903e-09), RealScalar(-1.14897317243732e-09), RealScalar(-2.87243293150586e-10), RealScalar( -7.18108232902250e-11), RealScalar(-1.79527058227174e-11), RealScalar(-4.48817645568941e-12), RealScalar(-1.12204411392298e-12), RealScalar(-2.80511028480785e-13), RealScalar(-7.01277571201985e-14), RealScalar(-1.75319392800498e-14), RealScalar(-4.38298482001247e-15), RealScalar(-1.09574620500312e-15), RealScalar(-2.73936551250781e-16), RealScalar(-6.84841378126949e-17), RealScalar(-1.71210344531737e-17), RealScalar(-4.28025861329343e-18) }; // m_minus_sin_2_PI_div_n_LUT[i] = -std::sin(2 * M_PI / std::pow(2,i)); const RealScalar m_minus_sin_2_PI_div_n_LUT[32] = { RealScalar(0.0), RealScalar(0.0), RealScalar(-1.00000000000000e+00), RealScalar(-7.07106781186547e-01), RealScalar(-3.82683432365090e-01), RealScalar(-1.95090322016128e-01), RealScalar(-9.80171403295606e-02), RealScalar(-4.90676743274180e-02), RealScalar(-2.45412285229123e-02), RealScalar(-1.22715382857199e-02), RealScalar(-6.13588464915448e-03), RealScalar(-3.06795676296598e-03), RealScalar(-1.53398018628477e-03), RealScalar(-7.66990318742704e-04), RealScalar(-3.83495187571396e-04), RealScalar(-1.91747597310703e-04), RealScalar(-9.58737990959773e-05), RealScalar(-4.79368996030669e-05), RealScalar(-2.39684498084182e-05), RealScalar(-1.19842249050697e-05), RealScalar(-5.99211245264243e-06), RealScalar(-2.99605622633466e-06), RealScalar(-1.49802811316901e-06), RealScalar(-7.49014056584716e-07), RealScalar(-3.74507028292384e-07), RealScalar(-1.87253514146195e-07), RealScalar(-9.36267570730981e-08), RealScalar(-4.68133785365491e-08), RealScalar(-2.34066892682746e-08), RealScalar(-1.17033446341373e-08), RealScalar(-5.85167231706864e-09), RealScalar(-2.92583615853432e-09) }; }; } // end namespace Eigen #endif // EIGEN_CXX11_TENSOR_TENSOR_FFT_H
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