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%matplotlib inline
Autograd: Automatic Differentiation
Central to all neural networks in PyTorch is the autograd
package.
Let’s first briefly visit this, and we will then go to training our
first neural network.
The autograd
package provides automatic differentiation for all operations
on Tensors. It is a define-by-run framework, which means that your backprop is
defined by how your code is run, and that every single iteration can be
different.
Let us see this in more simple terms with some examples.
Tensor
torch.Tensor
is the central class of the package. If you set its attribute
.requires_grad
as True
, it starts to track all operations on it. When
you finish your computation you can call .backward()
and have all the
gradients computed automatically. The gradient for this tensor will be
accumulated into .grad
attribute.
To stop a tensor from tracking history, you can call .detach()
to detach
it from the computation history, and to prevent future computation from being
tracked.
To prevent tracking history (and using memory), you can also wrap the code block
in with torch.no_grad():
. This can be particularly helpful when evaluating a
model because the model may have trainable parameters with
requires_grad=True
, but for which we don't need the gradients.
There’s one more class which is very important for autograd
implementation - a Function
.
Tensor
and Function
are interconnected and build up an acyclic
graph, that encodes a complete history of computation. Each tensor has
a .grad_fn
attribute that references a Function
that has created
the Tensor
(except for Tensors created by the user - their
grad_fn is None
).
If you want to compute the derivatives, you can call .backward()
on
a Tensor
. If Tensor
is a scalar (i.e. it holds a one element
data), you don’t need to specify any arguments to backward()
,
however if it has more elements, you need to specify a gradient
argument that is a tensor of matching shape.
import torch
Create a tensor and set requires_grad=True
to track computation with it
x = torch.ones(2, 2, requires_grad=True)
print(x)
tensor([[1., 1.], [1., 1.]], requires_grad=True)
Do a tensor operation:
y = x + 2
print(y)
tensor([[3., 3.], [3., 3.]], grad_fn=<AddBackward0>)
y
was created as a result of an operation, so it has a grad_fn
.
print(y.grad_fn)
<AddBackward0 object at 0x7f0d183e5160>
Do more operations on y
z = y * y * 3
out = z.mean()
print(z, out)
tensor([[27., 27.], [27., 27.]], grad_fn=<MulBackward0>) tensor(27., grad_fn=<MeanBackward0>)
.requires_grad_( ... )
changes an existing Tensor's requires_grad
flag in-place. The input flag defaults to False
if not given.
a = torch.randn(2, 2)
a = ((a * 3) / (a - 1))
print(a.requires_grad)
a.requires_grad_(True)
print(a.requires_grad)
b = (a * a).sum()
print(b.grad_fn)
False True <SumBackward0 object at 0x7f0cc743b438>
Gradients
Let's backprop now.
Because out
contains a single scalar, out.backward()
is
equivalent to out.backward(torch.tensor(1.))
.
out.backward()
Print gradients d(out)/dx
print(x.grad)
tensor([[4.5000, 4.5000], [4.5000, 4.5000]])
You should have got a matrix of 4.5
. Let’s call the out
_Tensor “$o$”.
We have that $o = \frac{1}{4}\sum_i z_i$,
$z_i = 3(x_i+2)^2$ and $z_i\bigr\rvert_{x_i=1} = 27$.
Therefore,
$\frac{\partial o}{\partial x_i} = \frac{3}{2}(x_i+2)$, hence
$\frac{\partial o}{\partial x_i}\bigr\rvert_{x_i=1} = \frac{9}{2} = 4.5$.
Mathematically, if you have a vector valued function $\vec{y}=f(\vec{x})$, then the gradient of $\vec{y}$ with respect to $\vec{x}$ is a Jacobian matrix:
\begin{align}J=\left(\begin{array}{ccc} \frac{\partial y_{1}}{\partial x_{1}} & \cdots & \frac{\partial y_{1}}{\partial x_{n}}\\ \vdots & \ddots & \vdots\\ \frac{\partial y_{m}}{\partial x_{1}} & \cdots & \frac{\partial y_{m}}{\partial x_{n}} \end{array}\right)\end{align}
Generally speaking, torch.autograd
is an engine for computing
vector-Jacobian product. That is, given any vector
$v=\left(\begin{array}{cccc} v_{1} & v_{2} & \cdots & v_{m}\end{array}\right)^{T}$,
compute the product $v^{T}\cdot J$. If $v$ happens to be
the gradient of a scalar function $l=g\left(\vec{y}\right)$,
that is,
$v=\left(\begin{array}{ccc}\frac{\partial l}{\partial y_{1}} & \cdots & \frac{\partial l}{\partial y_{m}}\end{array}\right)^{T}$,
then by the chain rule, the vector-Jacobian product would be the
gradient of $l$ with respect to $\vec{x}$:
\begin{align}J^{T}\cdot v=\left(\begin{array}{ccc} \frac{\partial y_{1}}{\partial x_{1}} & \cdots & \frac{\partial y_{m}}{\partial x_{1}}\\ \vdots & \ddots & \vdots\\ \frac{\partial y_{1}}{\partial x_{n}} & \cdots & \frac{\partial y_{m}}{\partial x_{n}} \end{array}\right)\left(\begin{array}{c} \frac{\partial l}{\partial y_{1}}\\ \vdots\\ \frac{\partial l}{\partial y_{m}} \end{array}\right)=\left(\begin{array}{c} \frac{\partial l}{\partial x_{1}}\\ \vdots\\ \frac{\partial l}{\partial x_{n}} \end{array}\right)\end{align}
(Note that $v^{T}\cdot J$ gives a row vector which can be treated as a column vector by taking $J^{T}\cdot v$.)
This characteristic of vector-Jacobian product makes it very convenient to feed external gradients into a model that has non-scalar output.
Now let's take a look at an example of vector-Jacobian product:
x = torch.randn(3, requires_grad=True)
y = x * 2
while y.data.norm() < 1000:
y = y * 2
print(y)
tensor([1688.6201, -110.9400, 181.5985], grad_fn=<MulBackward0>)
Now in this case y
is no longer a scalar. torch.autograd
could not compute the full Jacobian directly, but if we just
want the vector-Jacobian product, simply pass the vector to
backward
as argument:
v = torch.tensor([0.1, 1.0, 0.0001], dtype=torch.float)
y.backward(v)
print(x.grad)
tensor([1.0240e+02, 1.0240e+03, 1.0240e-01])
You can also stop autograd from tracking history on Tensors
with .requires_grad=True
either by wrapping the code block in
with torch.no_grad():
print(x.requires_grad)
print((x ** 2).requires_grad)
with torch.no_grad():
print((x ** 2).requires_grad)
True True False
Or by using .detach()
to get a new Tensor with the same
content but that does not require gradients:
print(x.requires_grad)
y = x.detach()
print(y.requires_grad)
print(x.eq(y).all())
True False tensor(True)
Read Later:
Document about autograd.Function
is at
https://pytorch.org/docs/stable/autograd.html#function