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The fastest JS Radix-4/Radix-2 FFT implementation

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FFT.js

Build Status NPM version

Implementation of Radix-4 FFT.

Usage

const FFT = require('fft.js');

const f = new FFT(4096);

const input = new Array(4096);
input.fill(0);

const out = f.createComplexArray();

If data has just real numbers as is the case when toComplexArray is used - real FFT may be run to compute it 25% faster:

const realInput = new Array(f.size);
f.realTransform(out, realInput);

realTransform fills just the left half of the out, so if the full spectrum is needed (which is symmetric), do the following:

f.completeSpectrum(out);

If data on other hand is a complex array:

const data = f.toComplexArray(input);
f.transform(out, data);

Inverse fourier transform:

f.inverseTransform(data, out);

Benchmarks

$ npm run bench
===== table construction =====
    fft.js x 1,426 ops/sec ±0.70% (93 runs sampled)
  Fastest is fft.js
===== transform size=2048 =====
    fft.js x 35,153 ops/sec ±0.83% (94 runs sampled)
    jensnockert x 5,037 ops/sec ±0.98% (91 runs sampled)
    dsp.js x 23,143 ops/sec ±0.64% (96 runs sampled)
    drom x 14,372 ops/sec ±0.76% (92 runs sampled)
  Fastest is fft.js
===== transform size=4096 =====
    fft.js x 15,676 ops/sec ±0.76% (94 runs sampled)
    jensnockert x 3,864 ops/sec ±1.02% (93 runs sampled)
    dsp.js x 7,905 ops/sec ±0.50% (97 runs sampled)
    drom x 6,718 ops/sec ±0.78% (96 runs sampled)
  Fastest is fft.js
===== transform size=8192 =====
    fft.js x 6,896 ops/sec ±0.79% (96 runs sampled)
    jensnockert x 1,193 ops/sec ±0.73% (94 runs sampled)
    dsp.js x 2,300 ops/sec ±0.74% (95 runs sampled)
    drom x 3,164 ops/sec ±0.67% (95 runs sampled)
  Fastest is fft.js
===== transform size=16384 =====
    fft.js x 3,123 ops/sec ±0.84% (95 runs sampled)
    jensnockert x 855 ops/sec ±1.02% (92 runs sampled)
    dsp.js x 948 ops/sec ±0.70% (94 runs sampled)
    drom x 1,428 ops/sec ±0.56% (93 runs sampled)
  Fastest is fft.js
===== realTransform size=2048 =====
    fft.js x 47,511 ops/sec ±0.93% (91 runs sampled)
    fourier-transform x 34,859 ops/sec ±0.77% (93 runs sampled)
  Fastest is fft.js
===== realTransform size=4096 =====
    fft.js x 21,841 ops/sec ±0.70% (94 runs sampled)
    fourier-transform x 16,135 ops/sec ±0.39% (93 runs sampled)
  Fastest is fft.js
===== realTransform size=8192 =====
    fft.js x 9,665 ops/sec ±0.65% (95 runs sampled)
    fourier-transform x 6,456 ops/sec ±0.83% (93 runs sampled)
  Fastest is fft.js
===== realTransform size=16384 =====
    fft.js x 4,399 ops/sec ±0.82% (93 runs sampled)
    fourier-transform x 2,745 ops/sec ±0.68% (94 runs sampled)
  Fastest is fft.js

API Details

Constructor

const FFT = require('fft.js');

const fft = new FFT(size);

NOTE: size MUST be a power of two and MUST be bigger than 1.

If you are looking to find the nearest power of 2 given the size of your dataset, here is a good tutorial

Input/Output formats and helper methods.

fft.createComplexArray()

Create an array of size equal to fft.size * 2. This array contains fft.size complex numbers whose real and imaginary parts are interleaved like this:

const complexArray = [ real0, imaginary0, real1, imaginary1, ... ];

fft.toComplexArray(realInput, /* optional */ storage)

Use provided storage or create a new complex array and fill all real slots with values from realInput array, and all imaginary slots with zeroes.

NOTE: Always provide storage for better performance and to avoid extra time in Garbage Collection.

fft.fromComplexArray(complexInput, /* optional */ storage)

Use provided storage or create an array of size fft.size and fill it with real values from the complexInput.

NOTE: Imaginary values from complexInput are ignored. This is a convenience method.

NOTE: Always provide storage for better performance and to avoid extra time in Garbage Collection.

fft.completeSpectrum(spectrum)

Fill the right half of spectrum complex array (See: fft.createComplexArray()) with the complex conjugates of the left half:

for (every every `i` between 1 and (N / 2 - 1))
  spectrum[N - i] = spectrum*[i]

NOTE: This method may be used with fft.realTransform() if full output is desired.

FFT Methods

fft.realTransform(output, input)

Take array of real numbers input and perform FFT transformation on it, filling the left half of the output with the real part of the Fourier Transform's complex output (See: fft.completeSpectrum()).

NOTE: Always use this method if the input for FFT transformation is real (has no imaginary parts). It is about 40% faster to do such transformation this way.

NOTE: input - real array of size fft.size, output - complex array (See: fft.createComplexArray()).

fft.transform(output, input)

Perform transformation on complex input array and store results in the complex output array.

NOTE: input and output are complex arrays (See: fft.createComplexArray()).

fft.inverseTransform(output, input)

Perform inverse Fourier transform on complex input array and store results in the complex output array.

NOTE: input and output are complex arrays (See: fft.createComplexArray()).

LICENSE

This software is licensed under the MIT License.

Copyright Fedor Indutny, 2017.

Permission is hereby granted, free of charge, to any person obtaining a copy of this software and associated documentation files (the "Software"), to deal in the Software without restriction, including without limitation the rights to use, copy, modify, merge, publish, distribute, sublicense, and/or sell copies of the Software, and to permit persons to whom the Software is furnished to do so, subject to the following conditions:

The above copyright notice and this permission notice shall be included in all copies or substantial portions of the Software.

THE SOFTWARE IS PROVIDED "AS IS", WITHOUT WARRANTY OF ANY KIND, EXPRESS OR IMPLIED, INCLUDING BUT NOT LIMITED TO THE WARRANTIES OF MERCHANTABILITY, FITNESS FOR A PARTICULAR PURPOSE AND NONINFRINGEMENT. IN NO EVENT SHALL THE AUTHORS OR COPYRIGHT HOLDERS BE LIABLE FOR ANY CLAIM, DAMAGES OR OTHER LIABILITY, WHETHER IN AN ACTION OF CONTRACT, TORT OR OTHERWISE, ARISING FROM, OUT OF OR IN CONNECTION WITH THE SOFTWARE OR THE USE OR OTHER DEALINGS IN THE SOFTWARE.

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The fastest JS Radix-4/Radix-2 FFT implementation

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