nn_batch_norm2d: BatchNorm2D
In torch: Tensors and Neural Networks with 'GPU' Acceleration
nn_batch_norm2d R Documentation
BatchNorm2D
Description
Applies Batch Normalization over a 4D input (a mini-batch of 2D inputs
additional channel dimension) as described in the paper
Batch Normalization: Accelerating Deep Network Training by Reducing Internal Covariate Shift.
Usage
nn_batch_norm2d(
num_features,
eps = 1e-05,
momentum = 0.1,
affine = TRUE,
track_running_stats = TRUE
)
Arguments
num_features
C from an expected input of size
(N, C, H, W)
eps
a value added to the denominator for numerical stability.
Default: 1e-5
momentum
the value used for the running_mean and running_var
computation. Can be set to None for cumulative moving average
(i.e. simple average). Default: 0.1
affine
a boolean value that when set to TRUE, this module has
learnable affine parameters. Default: TRUE
track_running_stats
a boolean value that when set to TRUE, this
module tracks the running mean and variance, and when set to FALSE,
this module does not track such statistics and uses batch statistics instead
in both training and eval modes if the running mean and variance are None.
Default: TRUE
Details
y = \frac{x - \mathrm{E}[x]}{ \sqrt{\mathrm{Var}[x] + \epsilon}} * \gamma + \beta
The mean and standard-deviation are calculated per-dimension over
the mini-batches and \gamma and \beta are learnable parameter vectors
of size C (where C is the input size). By default, the elements of \gamma are set
to 1 and the elements of \beta are set to 0. The standard-deviation is calculated
via the biased estimator, equivalent to torch_var(input, unbiased=FALSE).
Also by default, during training this layer keeps running estimates of its
computed mean and variance, which are then used for normalization during
evaluation. The running estimates are kept with a default momentum
of 0.1.
If track_running_stats is set to FALSE, this layer then does not
keep running estimates, and batch statistics are instead used during
evaluation time as well.
Shape
Input: (N, C, H, W)
Output: (N, C, H, W) (same shape as input)
Note
This momentum argument is different from one used in optimizer
classes and the conventional notion of momentum. Mathematically, the
update rule for running statistics here is
\hat{x}_{\mbox{new}} = (1 - \mbox{momentum}) \times \hat{x} + \mbox{momentum} \times x_t,
where \hat{x} is the estimated statistic and x_t is the
new observed value.
Because the Batch Normalization is done over the C dimension, computing statistics
on (N, H, W) slices, it's common terminology to call this Spatial Batch Normalization.
Examples
if (torch_is_installed()) {
# With Learnable Parameters
m <- nn_batch_norm2d(100)
# Without Learnable Parameters
m <- nn_batch_norm2d(100, affine = FALSE)
input <- torch_randn(20, 100, 35, 45)
output <- m(input)
}
torch documentation built on May 29, 2024, 9:54 a.m.
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| nn_batch_norm2d | R Documentation |
BatchNorm2D
Description
Applies Batch Normalization over a 4D input (a mini-batch of 2D inputs additional channel dimension) as described in the paper Batch Normalization: Accelerating Deep Network Training by Reducing Internal Covariate Shift.
Usage
nn_batch_norm2d(
num_features,
eps = 1e-05,
momentum = 0.1,
affine = TRUE,
track_running_stats = TRUE
)
Arguments
num_features |
|
eps |
a value added to the denominator for numerical stability. Default: 1e-5 |
momentum |
the value used for the running_mean and running_var
computation. Can be set to |
affine |
a boolean value that when set to |
track_running_stats |
a boolean value that when set to |
Details
y = \frac{x - \mathrm{E}[x]}{ \sqrt{\mathrm{Var}[x] + \epsilon}} * \gamma + \beta
The mean and standard-deviation are calculated per-dimension over
the mini-batches and \gamma and \beta are learnable parameter vectors
of size C (where C is the input size). By default, the elements of \gamma are set
to 1 and the elements of \beta are set to 0. The standard-deviation is calculated
via the biased estimator, equivalent to torch_var(input, unbiased=FALSE).
Also by default, during training this layer keeps running estimates of its
computed mean and variance, which are then used for normalization during
evaluation. The running estimates are kept with a default momentum
of 0.1.
If track_running_stats is set to FALSE, this layer then does not
keep running estimates, and batch statistics are instead used during
evaluation time as well.
Shape
Input:
(N, C, H, W)Output:
(N, C, H, W)(same shape as input)
Note
This momentum argument is different from one used in optimizer
classes and the conventional notion of momentum. Mathematically, the
update rule for running statistics here is
\hat{x}_{\mbox{new}} = (1 - \mbox{momentum}) \times \hat{x} + \mbox{momentum} \times x_t,
where \hat{x} is the estimated statistic and x_t is the
new observed value.
Because the Batch Normalization is done over the C dimension, computing statistics
on (N, H, W) slices, it's common terminology to call this Spatial Batch Normalization.
Examples
if (torch_is_installed()) {
# With Learnable Parameters
m <- nn_batch_norm2d(100)
# Without Learnable Parameters
m <- nn_batch_norm2d(100, affine = FALSE)
input <- torch_randn(20, 100, 35, 45)
output <- m(input)
}
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