kopia lustrzana https://github.com/f4exb/sdrangel
392 wiersze
10 KiB
C++
392 wiersze
10 KiB
C++
#ifndef INCLUDE_KISSFFT_H
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#define INCLUDE_KISSFFT_H
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#include <complex>
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#include <vector>
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/*
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Copyright (c) 2003-2010 Mark Borgerding
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All rights reserved.
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Redistribution and use in source and binary forms, with or without
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modification, are permitted provided that the following conditions
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are met:
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* Redistributions of source code must retain the above copyright
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notice, this list of conditions and the following disclaimer.
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* Redistributions in binary form must reproduce the above copyright
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notice, this list of conditions and the following disclaimer in the
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documentation and/or other materials provided with the distribution.
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* Neither the author nor the names of any contributors may be used to
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endorse or promote products derived from this software without
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specific prior written permission.
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THIS SOFTWARE IS PROVIDED BY THE COPYRIGHT HOLDERS AND CONTRIBUTORS "AS IS"
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AND ANY EXPRESS OR IMPLIED WARRANTIES, INCLUDING, BUT NOT LIMITED TO, THE
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IMPLIED WARRANTIES OF MERCHANTABILITY AND FITNESS FOR A PARTICULAR PURPOSE
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ARE DISCLAIMED. IN NO EVENT SHALL THE COPYRIGHT OWNER OR CONTRIBUTORS BE
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LIABLE FOR ANY DIRECT, INDIRECT, INCIDENTAL, SPECIAL, EXEMPLARY, OR
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CONSEQUENTIAL DAMAGES (INCLUDING, BUT NOT LIMITED TO, PROCUREMENT OF
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SUBSTITUTE GOODS OR SERVICES; LOSS OF USE, DATA, OR PROFITS; OR BUSINESS
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INTERRUPTION) HOWEVER CAUSED AND ON ANY THEORY OF LIABILITY, WHETHER IN
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CONTRACT, STRICT LIABILITY, OR TORT (INCLUDING NEGLIGENCE OR OTHERWISE)
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ARISING IN ANY WAY OUT OF THE USE OF THIS SOFTWARE, EVEN IF ADVISED OF
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THE POSSIBILITY OF SUCH DAMAGE.
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*/
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namespace kissfft_utils {
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template<typename T_scalar, typename T_complex>
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struct traits {
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typedef T_scalar scalar_type;
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typedef T_complex cpx_type;
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void fill_twiddles(std::complex<T_scalar>* dst, int nfft, bool inverse)
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{
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T_scalar phinc = (inverse ? 2 : -2) * acos((T_scalar)-1) / nfft;
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for(int i = 0; i < nfft; ++i)
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dst[i] = exp(std::complex<T_scalar>(0, i * phinc));
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}
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void prepare(std::vector<std::complex<T_scalar> >& dst, int nfft, bool inverse, std::vector<int>& stageRadix, std::vector<int>& stageRemainder)
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{
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_twiddles.resize(nfft);
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fill_twiddles(&_twiddles[0], nfft, inverse);
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dst = _twiddles;
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//factorize
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//start factoring out 4's, then 2's, then 3,5,7,9,...
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int n = nfft;
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int p = 4;
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do {
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while(n % p) {
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switch(p) {
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case 4:
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p = 2;
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break;
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case 2:
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p = 3;
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break;
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default:
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p += 2;
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break;
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}
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if(p * p > n)
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p = n;// no more factors
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}
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n /= p;
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stageRadix.push_back(p);
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stageRemainder.push_back(n);
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} while(n > 1);
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}
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std::vector<cpx_type> _twiddles;
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const cpx_type twiddle(int i)
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{
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return _twiddles[i];
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}
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};
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} // namespace
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template<typename T_Scalar, typename T_Complex, typename T_traits = kissfft_utils::traits<T_Scalar, T_Complex> >
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class kissfft {
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public:
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typedef T_traits traits_type;
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typedef typename traits_type::scalar_type scalar_type;
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typedef typename traits_type::cpx_type cpx_type;
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kissfft()
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{
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}
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kissfft(int nfft, bool inverse, const traits_type & traits = traits_type()) :
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_nfft(nfft), _inverse(inverse), _traits(traits)
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{
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_traits.prepare(_twiddles, _nfft, _inverse, _stageRadix, _stageRemainder);
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}
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void configure(int nfft, bool inverse, const traits_type & traits = traits_type())
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{
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_twiddles.clear();
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_stageRadix.clear();
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_stageRemainder.clear();
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_nfft = nfft;
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_inverse = inverse;
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_traits = traits;
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_traits.prepare(_twiddles, _nfft, _inverse, _stageRadix, _stageRemainder);
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}
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void transform(const cpx_type* src, cpx_type* dst)
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{
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kf_work(0, dst, src, 1, 1);
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}
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private:
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void kf_work(int stage, cpx_type* Fout, const cpx_type* f, size_t fstride, size_t in_stride)
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{
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int p = _stageRadix[stage];
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int m = _stageRemainder[stage];
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cpx_type * Fout_beg = Fout;
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cpx_type * Fout_end = Fout + p * m;
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if(m == 1) {
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do {
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*Fout = *f;
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f += fstride * in_stride;
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} while(++Fout != Fout_end);
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} else {
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do {
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// recursive call:
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// DFT of size m*p performed by doing
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// p instances of smaller DFTs of size m,
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// each one takes a decimated version of the input
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kf_work(stage + 1, Fout, f, fstride * p, in_stride);
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f += fstride * in_stride;
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} while((Fout += m) != Fout_end);
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}
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Fout = Fout_beg;
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// recombine the p smaller DFTs
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switch(p) {
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case 2:
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kf_bfly2(Fout, fstride, m);
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break;
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case 3:
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kf_bfly3(Fout, fstride, m);
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break;
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case 4:
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kf_bfly4(Fout, fstride, m);
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break;
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case 5:
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kf_bfly5(Fout, fstride, m);
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break;
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default:
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kf_bfly_generic(Fout, fstride, m, p);
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break;
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}
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}
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// these were #define macros in the original kiss_fft
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void C_ADD(cpx_type& c, const cpx_type& a, const cpx_type& b)
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{
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c = a + b;
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}
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void C_MUL(cpx_type& c, const cpx_type& a, const cpx_type& b)
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{
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//c = a * b;
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c = cpx_type(a.real() * b.real() - a.imag() * b.imag(), a.real() * b.imag() + a.imag() * b.real());
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}
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void C_SUB(cpx_type& c, const cpx_type& a, const cpx_type& b)
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{
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c = a - b;
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}
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void C_ADDTO(cpx_type& c, const cpx_type& a)
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{
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c += a;
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}
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void C_FIXDIV(cpx_type&, int)
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{
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} // NO-OP for float types
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scalar_type S_MUL(const scalar_type& a, const scalar_type& b)
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{
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return a * b;
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}
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scalar_type HALF_OF(const scalar_type& a)
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{
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return a * .5;
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}
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void C_MULBYSCALAR(cpx_type& c, const scalar_type& a)
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{
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c *= a;
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}
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void kf_bfly2(cpx_type* Fout, const size_t fstride, int m)
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{
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for(int k = 0; k < m; ++k) {
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//cpx_type t = Fout[m + k] * _traits.twiddle(k * fstride);
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cpx_type t;
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C_MUL(t, Fout[m + k], _traits.twiddle(k * fstride));
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Fout[m + k] = Fout[k] - t;
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Fout[k] += t;
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}
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}
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void kf_bfly4(cpx_type* Fout, const size_t fstride, const size_t m)
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{
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cpx_type scratch[7];
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int negative_if_inverse = _inverse * -2 + 1;
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for(size_t k = 0; k < m; ++k) {
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//scratch[0] = Fout[k + m] * _traits.twiddle(k * fstride);
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C_MUL(scratch[0], Fout[k + m], _traits.twiddle(k * fstride));
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C_MUL(scratch[1], Fout[k + 2 * m], _traits.twiddle(k * fstride * 2));
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C_MUL(scratch[2], Fout[k + 3 * m], _traits.twiddle(k * fstride * 3));
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scratch[5] = Fout[k] - scratch[1];
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Fout[k] += scratch[1];
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scratch[3] = scratch[0] + scratch[2];
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scratch[4] = scratch[0] - scratch[2];
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scratch[4] = cpx_type(scratch[4].imag() * negative_if_inverse, -scratch[4].real() * negative_if_inverse);
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Fout[k + 2 * m] = Fout[k] - scratch[3];
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Fout[k] += scratch[3];
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Fout[k + m] = scratch[5] + scratch[4];
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Fout[k + 3 * m] = scratch[5] - scratch[4];
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}
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}
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void kf_bfly3(cpx_type* Fout, const size_t fstride, const size_t m)
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{
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size_t k = m;
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const size_t m2 = 2 * m;
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cpx_type* tw1;
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cpx_type* tw2;
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cpx_type scratch[5];
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cpx_type epi3;
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epi3 = _twiddles[fstride * m];
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tw1 = tw2 = &_twiddles[0];
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do {
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C_FIXDIV(*Fout, 3);
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C_FIXDIV(Fout[m], 3);
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C_FIXDIV(Fout[m2], 3);
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C_MUL(scratch[1], Fout[m], *tw1);
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C_MUL(scratch[2], Fout[m2], *tw2);
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C_ADD(scratch[3], scratch[1], scratch[2]);
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C_SUB(scratch[0], scratch[1], scratch[2]);
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tw1 += fstride;
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tw2 += fstride * 2;
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Fout[m] = cpx_type(Fout->real() - HALF_OF(scratch[3].real()), Fout->imag() - HALF_OF(scratch[3].imag()));
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C_MULBYSCALAR(scratch[0], epi3.imag());
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C_ADDTO(*Fout, scratch[3]);
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Fout[m2] = cpx_type(Fout[m].real() + scratch[0].imag(), Fout[m].imag() - scratch[0].real());
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C_ADDTO(Fout[m], cpx_type(-scratch[0].imag(), scratch[0].real()));
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++Fout;
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} while(--k);
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}
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void kf_bfly5(cpx_type* Fout, const size_t fstride, const size_t m)
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{
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cpx_type* Fout0;
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cpx_type* Fout1;
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cpx_type* Fout2;
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cpx_type* Fout3;
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cpx_type* Fout4;
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size_t u;
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cpx_type scratch[13];
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cpx_type* twiddles = &_twiddles[0];
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cpx_type* tw;
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cpx_type ya, yb;
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ya = twiddles[fstride * m];
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yb = twiddles[fstride * 2 * m];
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Fout0 = Fout;
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Fout1 = Fout0 + m;
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Fout2 = Fout0 + 2 * m;
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Fout3 = Fout0 + 3 * m;
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Fout4 = Fout0 + 4 * m;
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tw = twiddles;
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for(u = 0; u < m; ++u) {
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C_FIXDIV(*Fout0, 5);
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C_FIXDIV(*Fout1, 5);
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C_FIXDIV(*Fout2, 5);
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C_FIXDIV(*Fout3, 5);
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C_FIXDIV(*Fout4, 5);
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scratch[0] = *Fout0;
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C_MUL(scratch[1], *Fout1, tw[u * fstride]);
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C_MUL(scratch[2], *Fout2, tw[2 * u * fstride]);
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C_MUL(scratch[3], *Fout3, tw[3 * u * fstride]);
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C_MUL(scratch[4], *Fout4, tw[4 * u * fstride]);
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C_ADD(scratch[7], scratch[1], scratch[4]);
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C_SUB(scratch[10], scratch[1], scratch[4]);
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C_ADD(scratch[8], scratch[2], scratch[3]);
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C_SUB(scratch[9], scratch[2], scratch[3]);
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C_ADDTO(*Fout0, scratch[7]);
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C_ADDTO(*Fout0, scratch[8]);
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scratch[5] = scratch[0] + cpx_type(S_MUL(scratch[7].real(), ya.real()) + S_MUL(scratch[8].real(), yb.real()), S_MUL(scratch[7].imag(), ya.real())
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+ S_MUL(scratch[8].imag(), yb.real()));
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scratch[6] = cpx_type(S_MUL(scratch[10].imag(), ya.imag()) + S_MUL(scratch[9].imag(), yb.imag()), -S_MUL(scratch[10].real(), ya.imag()) - S_MUL(
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scratch[9].real(), yb.imag()));
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C_SUB(*Fout1, scratch[5], scratch[6]);
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C_ADD(*Fout4, scratch[5], scratch[6]);
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scratch[11] = scratch[0] + cpx_type(S_MUL(scratch[7].real(), yb.real()) + S_MUL(scratch[8].real(), ya.real()), S_MUL(scratch[7].imag(), yb.real())
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+ S_MUL(scratch[8].imag(), ya.real()));
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scratch[12] = cpx_type(-S_MUL(scratch[10].imag(), yb.imag()) + S_MUL(scratch[9].imag(), ya.imag()), S_MUL(scratch[10].real(), yb.imag()) - S_MUL(
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scratch[9].real(), ya.imag()));
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C_ADD(*Fout2, scratch[11], scratch[12]);
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C_SUB(*Fout3, scratch[11], scratch[12]);
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++Fout0;
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++Fout1;
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++Fout2;
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++Fout3;
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++Fout4;
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}
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}
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/* perform the butterfly for one stage of a mixed radix FFT */
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void kf_bfly_generic(cpx_type* Fout, const size_t fstride, int m, int p)
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{
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int u;
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int k;
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int q1;
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int q;
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cpx_type* twiddles = &_twiddles[0];
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cpx_type t;
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int Norig = _nfft;
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cpx_type* scratchbuf = new cpx_type[p];
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for(u = 0; u < m; ++u) {
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k = u;
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for(q1 = 0; q1 < p; ++q1) {
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scratchbuf[q1] = Fout[k];
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C_FIXDIV(scratchbuf[q1], p);
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k += m;
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}
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k = u;
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for(q1 = 0; q1 < p; ++q1) {
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int twidx = 0;
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Fout[k] = scratchbuf[0];
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for(q = 1; q < p; ++q) {
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twidx += fstride * k;
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if(twidx >= Norig)
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twidx -= Norig;
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C_MUL(t, scratchbuf[q], twiddles[twidx]);
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C_ADDTO(Fout[k], t);
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}
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k += m;
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}
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}
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delete[] scratchbuf;
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}
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int _nfft;
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bool _inverse;
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std::vector<cpx_type> _twiddles;
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std::vector<int> _stageRadix;
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std::vector<int> _stageRemainder;
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traits_type _traits;
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};
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#endif
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