A high-level toolbox for using complex valued neural networks in PyTorch.
Project description
complexPyTorch
A high-level toolbox for using complex valued neural networks in PyTorch.
Before version 1.7 of PyTroch, complex tensor were not supported.
The initial version of complexPyTorch represented complex tensor using two tensors, one for the real and one for the imaginary part.
Since version 1.7, compex tensors of type torch.complex64
are allowed, but only a limited number of operation are supported.
The current version complexPyTorch use complex tensors (hence requires PyTorch version >= 1.7) and add support for various operations and layers.
Installation
pip install complexPyTorch
Complex Valued Networks with PyTorch
Artificial neural networks are mainly used for treating data encoded in real values, such as digitized images or sounds. In such systems, using complex-valued tensor would be quite useless. However, for physic related topics, in particular when dealing with wave propagation, using complex values is interesting as the physics typically has linear, hence more simple, behavior when considering complex fields. complexPyTorch is a simple implementation of complex-valued functions and modules using the high-level API of PyTorch. Following [C. Trabelsi et al., International Conference on Learning Representations, (2018)], it allows the following layers and functions to be used with complex values:
- Linear
- Conv2d
- MaxPool2d
- Relu (ℂRelu)
- BatchNorm1d (Naive and Covariance approach)
- BatchNorm2d (Naive and Covariance approach)
Citating the code
If the code was helpful to your work, please consider citing it:
Syntax and usage
The syntax is supposed to copy the one of the standard real functions and modules from PyTorch.
The names are the same as in nn.modules
and nn.functional
except that they start with Complex
for Modules, e.g. ComplexRelu
, ComplexMaxPool2d
or complex_
for functions, e.g. complex_relu
, complex_max_pool2d
.
The only usage difference is that the forward function takes two tensors, corresponding to real and imaginary parts, and returns two ones too.
BatchNorm
For all other layers, using the recommendation of [C. Trabelsi et al., International Conference on Learning Representations, (2018)], the calculation can be done in a straightforward manner using functions and modules form nn.modules
and nn.functional
.
For instance, the function complex_relu
in complexFunctions
, or its associated module ComplexRelu
in complexLayers
, simply performs relu
both on the real and imaginary part and returns the two tensors.
The complex BatchNorm proposed in [C. Trabelsi et al., International Conference on Learning Representations, (2018)] requires the calculation of the inverse square root of the covariance matrix.
This is implemented in ComplexbatchNorm1D
and ComplexbatchNorm2D
but using the high-level PyTorch API, which is quite slow.
The gain of using this approach, however, can be experimentally marginal compared to the naive approach which consists in simply performing the BatchNorm on both the real and imaginary part, which is available using NaiveComplexbatchNorm1D
or NaiveComplexbatchNorm2D
.
Example
For illustration, here is a small example of a complex model. Note that in that example, complex values are not particularly useful, it just shows how one can handle complex ANNs.
import torch
import torch.nn as nn
import torch.nn.functional as F
from torchvision import datasets, transforms
from complexPyTorch.complexLayers import ComplexBatchNorm2d, ComplexConv2d, ComplexLinear
from complexPyTorch.complexFunctions import complex_relu, complex_max_pool2d
batch_size = 64
trans = transforms.Compose([transforms.ToTensor(), transforms.Normalize((0.5,), (1.0,))])
train_set = datasets.MNIST('../data', train=True, transform=trans, download=True)
test_set = datasets.MNIST('../data', train=False, transform=trans, download=True)
train_loader = torch.utils.data.DataLoader(train_set, batch_size= batch_size, shuffle=True)
test_loader = torch.utils.data.DataLoader(test_set, batch_size= batch_size, shuffle=True)
class ComplexNet(nn.Module):
def __init__(self):
super(ComplexNet, self).__init__()
self.conv1 = ComplexConv2d(1, 10, 5, 1)
self.bn = ComplexBatchNorm2d(10)
self.conv2 = ComplexConv2d(10, 20, 5, 1)
self.fc1 = ComplexLinear(4*4*20, 500)
self.fc2 = ComplexLinear(500, 10)
def forward(self,x):
x = self.conv1(x)
x = complex_relu(x)
x = complex_max_pool2d(x, 2, 2)
x = self.bn(x)
x = self.conv2(x)
x = complex_relu(x)
x = complex_max_pool2d(x, 2, 2)
x = x.view(-1,4*4*20)
x = self.fc1(x)
x = complex_relu(x)
x = self.fc2(x)
x = x.abs()
x = F.log_softmax(x, dim=1)
return x
device = torch.device('cuda' if torch.cuda.is_available() else 'cpu')
model = ComplexNet().to(device)
optimizer = torch.optim.SGD(model.parameters(), lr=0.01, momentum=0.9)
def train(model, device, train_loader, optimizer, epoch):
model.train()
for batch_idx, (data, target) in enumerate(train_loader):
data, target = data.to(device).type(torch.complex64), target.to(device)
optimizer.zero_grad()
output = model(data)
loss = F.nll_loss(output, target)
loss.backward()
optimizer.step()
if batch_idx % 100 == 0:
print('Train Epoch: {:3} [{:6}/{:6} ({:3.0f}%)]\tLoss: {:.6f}'.format(
epoch,
batch_idx * len(data),
len(train_loader.dataset),
100. * batch_idx / len(train_loader),
loss.item())
)
# Run training on 50 epochs
for epoch in range(50):
train(model, device, train_loader, optimizer, epoch)
Acknowledgments
I want to thank Piotr Bialecki for his invaluable help on the PyTorch forum.
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