- read the paper Real NVP and understand the approach
- run on CIFAR10
This is a PyTorch implementation of normalizing flows. Many popular flow architectures are implemented,
see the list below. The package can be easily installed via pip.
The basic usage is described here, and a full documentation
is available as well. There are several sample use cases implemented in the
examples folder,
including Glow,
a VAE, and
a Residual Flow.
| Architecture | Reference |
|---|---|
| Planar Flow | Rezende & Mohamed, 2015 |
| Radial Flow | Rezende & Mohamed, 2015 |
| NICE | Dinh et al., 2014 |
| Real NVP | Dinh et al., 2017 |
| Glow | Kingma et al., 2018 |
| Masked Autoregressive Flow | Papamakarios et al., 2017 |
| Neural Spline Flow | Durkan et al., 2019 |
| Circular Neural Spline Flow | Rezende et al., 2020 |
| Residual Flow | Chen et al., 2019 |
| Stochastic Normalizing Flow | Wu et al., 2020 |
Note that Neural Spline Flows with circular and non-circular coordinates are supported as well.
The latest version of the package can be installed via pip
pip install normflows
At least Python 3.7 is required. If you want to use a GPU, make sure that PyTorch is set up correctly by following the instructions at the PyTorch website.
To run the example notebooks clone the repository first
git clone https://github.com/VincentStimper/normalizing-flows.git
and then install the dependencies.
pip install -r requirements_examples.txt
A normalizing flow consists of a base distribution, defined in
nf.distributions.base,
and a list of flows, given in
nf.flows.
Let's assume our target is a 2D distribution. We pick a diagonal Gaussian
base distribution, which is the most popular choice. Our flow shall be a
Real NVP model and, therefore, we need
to define a neural network for computing the parameters of the affine coupling
map. One dimension is used to compute the scale and shift parameter for the
other dimension. After each coupling layer we swap their roles.
import normflows as nf
# Define 2D Gaussian base distribution
base = nf.distributions.base.DiagGaussian(2)
# Define list of flows
num_layers = 32
flows = []
for i in range(num_layers):
# Neural network with two hidden layers having 64 units each
# Last layer is initialized by zeros making training more stable
param_map = nf.nets.MLP([1, 64, 64, 2], init_zeros=True)
# Add flow layer
flows.append(nf.flows.AffineCouplingBlock(param_map))
# Swap dimensions
flows.append(nf.flows.Permute(2, mode='swap'))Once they are set up, we can define a
nf.NormalizingFlow
model. If the target density is available, it can be added to the model
to be used during training. Sample target distributions are given in
nf.distributions.target.
# If the target density is not given
model = nf.NormalizingFlow(base, flows)
# If the target density is given
target = nf.distributions.target.TwoMoons()
model = nf.NormalizingFlow(base, flows, target)The loss can be computed with the methods of the model and minimized.
# When doing maximum likelihood learning, i.e. minimizing the forward KLD
# with no target distribution given
loss = model.forward_kld(x)
# When minimizing the reverse KLD based on the given target distribution
loss = model.reverse_kld(num_samples=512)
# Optimization as usual
loss.backward()
optimizer.step()As more extensive version of this example is given as a notebook, which can directly be opened in Colab. There, we apply a Real NVP model to a bimodal target distribution and obtain the following results.
In another example, we apply a Neural Spline Flow model to a distribution defined on a cylinder. The resulting density is visualized below.
For more illustrative examples of how to use the package see the
examples
directory. More advanced experiments can be done with the scripts listed in the
repository about resampled base distributions,
see its experiments
folder.
The package has been used in several research papers, which are listed below.
Andrew Campbell, Wenlong Chen, Vincent Stimper, José Miguel Hernández-Lobato, and Yichuan Zhang. A gradient based strategy for Hamiltonian Monte Carlo hyperparameter optimization. In Proceedings of the 38th International Conference on Machine Learning, pp. 1238–1248. PMLR, 2021.
Vincent Stimper, Bernhard Schölkopf, José Miguel Hernández-Lobato. Resampling Base Distributions of Normalizing Flows. In Proceedings of The 25th International Conference on Artificial Intelligence and Statistics, volume 151, pp. 4915–4936, 2022.
Laurence I. Midgley, Vincent Stimper, Gregor N. C. Simm, Bernhard Schölkopf, José Miguel Hernández-Lobato. Flow Annealed Importance Sampling Bootstrap. ArXiv, abs/2208.01893, 2022.
Moreover, the boltzgen package
has been build upon normflows.