mirror of https://github.com/f4exb/sdrangel.git
395 lines
14 KiB
C++
395 lines
14 KiB
C++
///////////////////////////////////////////////////////////////////////////////////////
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// Copyright (C) 2017 Edouard Griffiths, F4EXB <f4exb06@gmail.com> //
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// Copyright (C) 2020 Kacper Michajłow <kasper93@gmail.com> //
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// //
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// This program is free software; you can redistribute it and/or modify //
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// it under the terms of the GNU General Public License as published by //
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// the Free Software Foundation as version 3 of the License, or //
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// (at your option) any later version. //
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// //
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// This program is distributed in the hope that it will be useful, //
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// but WITHOUT ANY WARRANTY; without even the implied warranty of //
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// MERCHANTABILITY or FITNESS FOR A PARTICULAR PURPOSE. See the //
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// GNU General Public License V3 for more details. //
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// //
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// You should have received a copy of the GNU General Public License //
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// along with this program. If not, see <http://www.gnu.org/licenses/>. //
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///////////////////////////////////////////////////////////////////////////////////////
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/*
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July 15, 2015
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Iowa Hills Software LLC
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http://www.iowahills.com
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*/
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#include <cmath>
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#include <new>
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#include <iostream>
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#include "wfir.h"
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#define M_2PI (2*M_PI)
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// This first calculates the impulse response for a rectangular window.
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// It then applies the windowing function of choice to the impulse response.
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void WFIR::BasicFIR(double *FirCoeff, int NumTaps, TPassTypeName PassType,
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double OmegaC, double BW, TWindowType WindowType, double WinBeta)
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{
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int j;
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double Arg, OmegaLow, OmegaHigh;
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switch (PassType)
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{
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case LPF:
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for (j = 0; j < NumTaps; j++)
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{
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Arg = (double) j - (double) (NumTaps - 1) / 2.0;
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FirCoeff[j] = OmegaC * Sinc(OmegaC * Arg * M_PI);
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}
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break;
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case HPF:
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if (NumTaps % 2 == 1) // Odd tap counts
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{
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for (j = 0; j < NumTaps; j++)
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{
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Arg = (double) j - (double) (NumTaps - 1) / 2.0;
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FirCoeff[j] = Sinc(Arg * M_PI)
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- OmegaC * Sinc(OmegaC * Arg * M_PI);
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}
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}
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else // Even tap counts
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{
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for (j = 0; j < NumTaps; j++)
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{
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Arg = (double) j - (double) (NumTaps - 1) / 2.0;
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if (Arg == 0.0)
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FirCoeff[j] = 0.0;
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else
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FirCoeff[j] = cos(OmegaC * Arg * M_PI) / M_PI / Arg
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+ cos(Arg * M_PI);
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}
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}
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break;
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case BPF:
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OmegaLow = OmegaC - BW / 2.0;
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OmegaHigh = OmegaC + BW / 2.0;
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for (j = 0; j < NumTaps; j++)
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{
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Arg = (double) j - (double) (NumTaps - 1) / 2.0;
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if (Arg == 0.0)
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FirCoeff[j] = 0.0;
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else
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FirCoeff[j] = (cos(OmegaLow * Arg * M_PI)
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- cos(OmegaHigh * Arg * M_PI)) / M_PI / Arg;
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}
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break;
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case NOTCH: // If NumTaps is even for Notch filters, the response at Pi is attenuated.
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OmegaLow = OmegaC - BW / 2.0;
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OmegaHigh = OmegaC + BW / 2.0;
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for (j = 0; j < NumTaps; j++)
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{
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Arg = (double) j - (double) (NumTaps - 1) / 2.0;
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FirCoeff[j] = Sinc(Arg * M_PI)
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- OmegaHigh * Sinc(OmegaHigh * Arg * M_PI)
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- OmegaLow * Sinc(OmegaLow * Arg * M_PI);
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}
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break;
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}
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// WindowData can be used to window data before an FFT. When used for FIR filters we set
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// Alpha = 0.0 to prevent a flat top on the window and
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// set UnityGain = false to prevent the window gain from getting set to unity.
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WindowData(FirCoeff, NumTaps, WindowType, 0.0, WinBeta, false);
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}
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//---------------------------------------------------------------------------
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// This gets used with the Kaiser window.
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double WFIR::Bessel(double x)
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{
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double Sum = 0.0, XtoIpower;
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int i, j, Factorial;
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for (i = 1; i < 10; i++)
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{
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XtoIpower = pow(x / 2.0, (double) i);
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Factorial = 1;
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for (j = 1; j <= i; j++)
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Factorial *= j;
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Sum += pow(XtoIpower / (double) Factorial, 2.0);
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}
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return (1.0 + Sum);
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}
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//-----------------------------------------------------------------------------
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// This gets used with the Sinc window and various places in the BasicFIR function.
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double WFIR::Sinc(double x)
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{
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if (x > -1.0E-5 && x < 1.0E-5)
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return (1.0);
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return (sin(x) / x);
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}
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//---------------------------------------------------------------------------
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// These are the various windows definitions. These windows can be used for either
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// FIR filter design or with an FFT for spectral analysis.
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// Sourced verbatim from: ~MyDocs\Code\Common\FFTFunctions.cpp
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// For definitions, see this article: http://en.wikipedia.org/wiki/Window_function
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// This function has 6 inputs
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// Data is the array, of length N, containing the data to to be windowed.
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// This data is either a FIR filter sinc pulse, or the data to be analyzed by an fft.
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// WindowType is an enum defined in the header file, which is at the bottom of this file.
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// e.g. wtKAISER, wtSINC, wtHANNING, wtHAMMING, wtBLACKMAN, ...
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// Alpha sets the width of the flat top.
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// Windows such as the Tukey and Trapezoid are defined to have a variably wide flat top.
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// As can be seen by its definition, the Tukey is just a Hanning window with a flat top.
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// Alpha can be used to give any of these windows a partial flat top, except the Flattop and Kaiser.
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// Alpha = 0 gives the original window. (i.e. no flat top)
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// To generate a Tukey window, use a Hanning with 0 < Alpha < 1
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// To generate a Bartlett window (triangular), use a Trapezoid window with Alpha = 0.
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// Alpha = 1 generates a rectangular window in all cases. (except the Flattop and Kaiser)
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// Beta is used with the Kaiser, Sinc, and Sine windows only.
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// These three windows are primarily used for FIR filter design, not spectral analysis.
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// In FIR filter design, Beta controls the filter's transition bandwidth and the sidelobe levels.
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// The code ignores Beta except in the Kaiser, Sinc, and Sine window cases.
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// UnityGain controls whether the gain of these windows is set to unity.
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// Only the Flattop window has unity gain by design. The Hanning window, for example, has a gain
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// of 1/2. UnityGain = true will set the gain of all these windows to 1.
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// Then, when the window is applied to a signal, the signal's energy content is preserved.
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// Don't use this with FIR filter design however. Since most of the enegy in an FIR sinc pulse
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// is in the middle of the window, the window needs a peak amplitude of one, not unity gain.
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// Setting UnityGain = true will simply cause the resulting FIR filter to have excess gain.
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// If using these windows for FIR filters, start with the Kaiser, Sinc, or Sine windows and
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// adjust Beta for the desired transition BW and sidelobe levels (set Alpha = 0).
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// While the FlatTop is an excellent window for spectral analysis, don't use it for FIR filter design.
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// It has a peak amplitude of ~ 4.7 which causes the resulting FIR filter to have about this much gain.
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// It works poorly for FIR filters even if you adjust its peak amplitude.
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// The Trapezoid also works poorly for FIR filter design.
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// If using these windows with an fft for spectral analysis, start with the Hanning, Gauss, or Flattop.
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// When choosing a window for spectral analysis, you must trade off between resolution and amplitude accuracy.
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// The Hanning has the best resolution while the Flatop has the best amplitude accuracy.
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// The Gauss is midway between these two for both accuracy and resolution.
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// These three were the only windows available in the HP 89410A Vector Signal Analyzer. Which is to say,
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// unless you have specific windowing requirements, use one of these 3 for general purpose signal analysis.
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// Set UnityGain = true when using any of these windows for spectral analysis to preserve the signal's enegy level.
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void WFIR::WindowData(double *Data, int N, TWindowType WindowType, double Alpha,
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double Beta, bool UnityGain)
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{
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if (WindowType == wtNONE)
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return;
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int j, M, TopWidth;
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double dM, *WinCoeff;
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if (WindowType == wtKAISER || WindowType == wtFLATTOP)
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Alpha = 0.0;
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if (Alpha < 0.0)
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Alpha = 0.0;
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if (Alpha > 1.0)
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Alpha = 1.0;
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if (Beta < 0.0)
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Beta = 0.0;
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if (Beta > 10.0)
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Beta = 10.0;
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WinCoeff = new (std::nothrow) double[N + 2];
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if (WinCoeff == 0)
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{
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std::cerr
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<< "Failed to allocate memory in FFTFunctions::WindowFFTData() "
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<< std::endl;
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return;
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}
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TopWidth = (int) (Alpha * (double) N);
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if (TopWidth % 2 != 0)
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TopWidth++;
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if (TopWidth > N)
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TopWidth = N;
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M = N - TopWidth;
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dM = M + 1;
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// Calculate the window for N/2 points, then fold the window over (at the bottom).
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// TopWidth points will be set to 1.
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if (WindowType == wtKAISER)
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{
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double Arg;
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for (j = 0; j < M; j++)
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{
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Arg = Beta * sqrt(1.0 - pow(((double) (2 * j + 2) - dM) / dM, 2.0));
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WinCoeff[j] = Bessel(Arg) / Bessel(Beta);
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}
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}
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else if (WindowType == wtSINC) // Lanczos
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{
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for (j = 0; j < M; j++)
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WinCoeff[j] = Sinc((double) (2 * j + 1 - M) / dM * M_PI);
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for (j = 0; j < M; j++)
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WinCoeff[j] = pow(WinCoeff[j], Beta);
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}
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else if (WindowType == wtSINE) // Hanning if Beta = 2
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{
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for (j = 0; j < M / 2; j++)
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WinCoeff[j] = sin((double) (j + 1) * M_PI / dM);
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for (j = 0; j < M / 2; j++)
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WinCoeff[j] = pow(WinCoeff[j], Beta);
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}
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else if (WindowType == wtHANNING)
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{
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for (j = 0; j < M / 2; j++)
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WinCoeff[j] = 0.5 - 0.5 * cos((double) (j + 1) * M_2PI / dM);
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}
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else if (WindowType == wtHAMMING)
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{
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for (j = 0; j < M / 2; j++)
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WinCoeff[j] = 0.54 - 0.46 * cos((double) (j + 1) * M_2PI / dM);
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}
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else if (WindowType == wtBLACKMAN)
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{
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for (j = 0; j < M / 2; j++)
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{
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WinCoeff[j] = 0.42 - 0.50 * cos((double) (j + 1) * M_2PI / dM)
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+ 0.08 * cos((double) (j + 1) * M_2PI * 2.0 / dM);
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}
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}
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// See: http://www.bth.se/fou/forskinfo.nsf/0/130c0940c5e7ffcdc1256f7f0065ac60/$file/ICOTA_2004_ttr_icl_mdh.pdf
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else if (WindowType == wtFLATTOP)
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{
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for (j = 0; j <= M / 2; j++)
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{
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WinCoeff[j] = 1.0
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- 1.93293488969227 * cos((double) (j + 1) * M_2PI / dM)
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+ 1.28349769674027
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* cos((double) (j + 1) * M_2PI * 2.0 / dM)
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- 0.38130801681619
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* cos((double) (j + 1) * M_2PI * 3.0 / dM)
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+ 0.02929730258511
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* cos((double) (j + 1) * M_2PI * 4.0 / dM);
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}
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}
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else if (WindowType == wtBLACKMAN_HARRIS)
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{
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for (j = 0; j < M / 2; j++)
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{
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WinCoeff[j] = 0.35875 - 0.48829 * cos((double) (j + 1) * M_2PI / dM)
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+ 0.14128 * cos((double) (j + 1) * M_2PI * 2.0 / dM)
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- 0.01168 * cos((double) (j + 1) * M_2PI * 3.0 / dM);
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}
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}
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else if (WindowType == wtBLACKMAN_NUTTALL)
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{
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for (j = 0; j < M / 2; j++)
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{
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WinCoeff[j] = 0.3535819
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- 0.4891775 * cos((double) (j + 1) * M_2PI / dM)
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+ 0.1365995 * cos((double) (j + 1) * M_2PI * 2.0 / dM)
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- 0.0106411 * cos((double) (j + 1) * M_2PI * 3.0 / dM);
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}
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}
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else if (WindowType == wtNUTTALL)
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{
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for (j = 0; j < M / 2; j++)
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{
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WinCoeff[j] = 0.355768
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- 0.487396 * cos((double) (j + 1) * M_2PI / dM)
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+ 0.144232 * cos((double) (j + 1) * M_2PI * 2.0 / dM)
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- 0.012604 * cos((double) (j + 1) * M_2PI * 3.0 / dM);
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}
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}
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else if (WindowType == wtKAISER_BESSEL)
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{
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for (j = 0; j <= M / 2; j++)
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{
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WinCoeff[j] = 0.402 - 0.498 * cos(M_2PI * (double) (j + 1) / dM)
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+ 0.098 * cos(2.0 * M_2PI * (double) (j + 1) / dM)
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+ 0.001 * cos(3.0 * M_2PI * (double) (j + 1) / dM);
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}
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}
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else if (WindowType == wtTRAPEZOID) // Rectangle for Alpha = 1 Triangle for Alpha = 0
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{
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int K = M / 2;
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if (M % 2)
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K++;
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for (j = 0; j < K; j++)
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WinCoeff[j] = (double) (j + 1) / (double) K;
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}
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// This definition is from http://en.wikipedia.org/wiki/Window_function (Gauss Generalized normal window)
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// We set their p = 2, and use Alpha in the numerator, instead of Sigma in the denominator, as most others do.
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// Alpha = 2.718 puts the Gauss window response midway between the Hanning and the Flattop (basically what we want).
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// It also gives the same BW as the Gauss window used in the HP 89410A Vector Signal Analyzer.
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// Alpha = 1.8 puts it quite close to the Hanning.
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else if (WindowType == wtGAUSS)
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{
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for (j = 0; j < M / 2; j++)
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{
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WinCoeff[j] = ((double) (j + 1) - dM / 2.0) / (dM / 2.0) * 2.7183;
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WinCoeff[j] *= WinCoeff[j];
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WinCoeff[j] = exp(-WinCoeff[j]);
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}
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}
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else // Error.
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{
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std::cerr << "Incorrect window type in WindowFFTData" << std::endl;
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delete[] WinCoeff;
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return;
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}
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// Fold the coefficients over.
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for (j = 0; j < M / 2; j++)
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WinCoeff[N - j - 1] = WinCoeff[j];
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// This is the flat top if Alpha > 0. Cannot be applied to a Kaiser or Flat Top.
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if (WindowType != wtKAISER && WindowType != wtFLATTOP)
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{
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for (j = M / 2; j < N - M / 2; j++)
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WinCoeff[j] = 1.0;
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}
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// This will set the gain of the window to 1. Only the Flattop window has unity gain by design.
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if (UnityGain)
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{
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double Sum = 0.0;
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for (j = 0; j < N; j++)
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Sum += WinCoeff[j];
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Sum /= (double) N;
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if (Sum != 0.0)
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for (j = 0; j < N; j++)
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WinCoeff[j] /= Sum;
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}
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// Apply the window to the data.
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for (j = 0; j < N; j++)
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Data[j] *= WinCoeff[j];
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delete[] WinCoeff;
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}
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