# What is the difference between performing upsampling together with strided transpose convolution and transpose convolution with stride 1 only?

I noticed in a number of places that people use something like this, usually in fully convolutional networks, autoencoders, and similar:

``````model.add(UpSampling2D(size=(2,2)))
``````

I am wondering what is the difference between that and simply:

``````model.add(Conv2DTranspose(kernel_size=k, padding='same', strides=(2,2))
``````

Links towards any papers that explain this difference are welcome.

Here and here you can find a really nice explanation of how transposed convolutions work. To sum up both of these approaches:

1. In your first approach, you are first upsampling your feature map:

``````[[1, 2], [3, 4]] -> [[1, 1, 2, 2], [1, 1, 2, 2], [3, 3, 4, 4], [3, 3, 4, 4]]
``````

and then you apply a classical convolution (as `Conv2DTranspose` with `stride=1` and `padding='same'` is equivalent to `Conv2D`).

2. In your second approach you are first un(max)pooling your feature map:

``````[[1, 2], [3, 4]] -> [[1, 0, 2, 0], [0, 0, 0, 0], [3, 0, 4, 0], [0, 0, 0, 0]]
``````

and then apply a classical convolution with `filter_size`, filters`, etc. Fun fact is that - although these approaches are different they share something in common. Transpose convolution is meant to be the approximation of gradient of convolution, so the first approach is approximating `sum pooling` whereas second `max pooling` gradient. This makes the first results to produce slightly smoother results.

Other reasons why you might see the first approach are:

• `Conv2DTranspose` (and its equivalents) are relatively new in `keras` so the only way to perform learnable upsampling was using `Upsample2D`,
• Author of `keras` - Francois Chollet used this approach in one of his tutorials,
• In the past equivalents of transpose, convolution seemed to work awful in `keras` due to some `API` inconsistencies.

I just want to point out a couple of things that you mentioned. `Upsample2D` is not a learnable layer since There is literally 0 parameter.

Also, we can not justify the reason why we might want to use the first approach because Francoise Chollet introduced the usage in his example.