Pytorch Wavelet Toolbox (ptwt)
Welcome to the PyTorch wavelet toolbox. This package implements:
- the fast wavelet transform (fwt) via
wavedec
and its inverse by providing thewaverec
function, - the two-dimensional fwt is called
wavedec2
the synthesis counterpartwaverec2
, wavedec3
andwaverec3
cover the three-dimensional analysis and synthesis case,fswavedec2
,fswavedec3
,fswaverec2
andfswaverec3
support separable transformations.MatrixWavedec
andMatrixWaverec
implement sparse-matrix-based fast wavelet transforms with boundary filters,- 2d sparse-matrix transforms with separable & non-separable boundary filters are available,
MatrixWavedec3
andMatrixWaverec3
allow separable 3D-fwt's with boundary filters.cwt
computes a one-dimensional continuous forward transform,- single and two-dimensional wavelet packet forward and backward transforms are available via the
WaveletPacket
andWaveletPacket2D
objects, - finally, this package provides adaptive wavelet support (experimental).
This toolbox extends PyWavelets. In addition to boundary wavelets, we provide GPU and gradient support via a PyTorch backend. Complete documentation is available at: https://pytorch-wavelet-toolbox.readthedocs.io/en/latest/ptwt.html
Installation
Install the toolbox via pip or clone this repository. In order to use pip
, type:
$ pip install ptwt
You can remove it later by typing pip uninstall ptwt
.
Example usage:
Single dimensional transform
One way to compute fast wavelet transforms is to rely on padding and convolution. Consider the following example:
import torch
import numpy as np
import pywt
import ptwt # use "from src import ptwt" for a cloned the repo
# generate an input of even length.
data = np.array([0, 1, 2, 3, 4, 5, 6, 7, 7, 6, 5, 4, 3, 2, 1, 0])
data_torch = torch.from_numpy(data.astype(np.float32))
wavelet = pywt.Wavelet('haar')
# compare the forward fwt coefficients
print(pywt.wavedec(data, wavelet, mode='zero', level=2))
print(ptwt.wavedec(data_torch, wavelet, mode='zero', level=2))
# invert the fwt.
print(ptwt.waverec(ptwt.wavedec(data_torch, wavelet, mode='zero'),
wavelet))
The functions wavedec
and waverec
compute the 1d-fwt and its inverse.
Internally both rely on conv1d
, and its transposed counterpart conv_transpose1d
from the torch.nn.functional
module. This toolbox also supports discrete wavelets
see pywt.wavelist(kind='discrete')
. I have tested
Daubechies-Wavelets db-x
and symlets sym-x
, are usually a good starting point.
Two-dimensional transform
Analog to the 1d-case wavedec2
and waverec2
rely on
conv2d
, and its transposed counterpart conv_transpose2d
.
To test an example, run:
import ptwt, pywt, torch
import numpy as np
import scipy.misc
face = np.transpose(scipy.datasets.face(),
[2, 0, 1]).astype(np.float64)
pytorch_face = torch.tensor(face)
coefficients = ptwt.wavedec2(pytorch_face, pywt.Wavelet("haar"),
level=2, mode="constant")
reconstruction = ptwt.waverec2(coefficients, pywt.Wavelet("haar"))
np.max(np.abs(face - reconstruction.squeeze(1).numpy()))
Speed tests
Speed tests comparing our tools to related libraries are available.
Boundary Wavelets with Sparse-Matrices
In addition to convolution and padding approaches,
sparse-matrix-based code with boundary wavelet support is available.
In contrast to padding, boundary wavelets do not add extra pixels at
the edges.
Internally, boundary wavelet support relies on torch.sparse.mm
.
Generate 1d sparse matrix forward and backward transforms with the
MatrixWavedec
and MatrixWaverec
classes.
Reconsidering the 1d case, try:
import torch
import numpy as np
import pywt
import ptwt # use "from src import ptwt" for a cloned the repo
# generate an input of even length.
data = np.array([0, 1, 2, 3, 4, 5, 6, 7, 7, 6, 5, 4, 3, 2, 1, 0])
data_torch = torch.from_numpy(data.astype(np.float32))
# forward
matrix_wavedec = ptwt.MatrixWavedec(pywt.Wavelet("haar"), level=2)
coeff = matrix_wavedec(data_torch)
print(coeff)
# backward
matrix_waverec = ptwt.MatrixWaverec(pywt.Wavelet("haar"))
rec = matrix_waverec(coeff)
print(rec)
The process for the 2d transforms MatrixWavedec2
, MatrixWaverec2
works similarly.
By default, a separable transformation is used.
To use a non-separable transformation, pass separable=False
to MatrixWavedec2
and MatrixWaverec2
.
Separable transformations use a 1d transformation along both axes, which might be faster since fewer matrix entries
have to be orthogonalized.
Adaptive Wavelets
Experimental code to train an adaptive wavelet layer in PyTorch is available in the examples
folder. In addition to static wavelets
from pywt,
- Adaptive product-filters
- and optimizable orthogonal-wavelets are supported.
See https://github.com/v0lta/PyTorch-Wavelet-Toolbox/tree/main/examples/network_compression/ for a complete implementation.
Testing
The tests
folder contains multiple tests to allow independent verification of this toolbox.
The GitHub workflow executes a subset of all tests for efficiency reasons.
After cloning the repository, moving into the main directory, and installing nox
with pip install nox
run
$ nox --session test
to run all existing tests.
Citation
If you use this work in a scientific context, please cite the following:
@phdthesis{handle:20.500.11811/9245, urn: https://nbn-resolving.org/urn:nbn:de:hbz:5-63361, author = {{Moritz Wolter}}, title = {Frequency Domain Methods in Recurrent Neural Networks for Sequential Data Processing}, school = {Rheinische Friedrich-Wilhelms-Universität Bonn}, year = 2021, month = jul, url = {https://hdl.handle.net/20.500.11811/9245} }
If you use the boundary wavelet support, please additionally cite:
@thesis{Blanke2021, author = {Felix Blanke}, title = {{Randbehandlung bei Wavelets für Faltungsnetzwerke}}, type = {Bachelor's Thesis}, annote = {Gbachelor}, year = {2021}, school = {Institut f\"ur Numerische Simulation, Universit\"at Bonn} }