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JuPyter

JAX is a Python library designed for high-performance ML research. It is a powerful numerical computing library, just like Numpy, but with some key improvements.

In this course, you will learn all about JAX and its ecosystem of libraries (Haiku, Jraph, Chex, Flax, Optax). Addressing a wide range of audiences, you will cover several topics including linear algebra, random variables theory, pseudo-random number generation, and optimization algorithms.

By the end of this course, you will have a new set of skills that will make deep learning programming more intuitive, structured, and clean.

Introduction to JAX and Deep Learning

Here we'll focus on a quite important aspect of statistical learning. This lesson is advanced and can be reasonably skipped if needed.
## Introduction

We can easily compare a couple of scalar values by their difference or a ratio. Similarly, we can compare the two vectors by taking the L1 or L2 norm.

To extend this notion of divergence between a couple of distributions requires some better measures, though. There are several real-world applications where we need to find the similarity (or difference) between two distributions. For example, text comparison between two sequences in **bioinformatics**, text comparison in **Natural Language Processing (NLP)**, comparison of generated images by **Generative Adversarial Networks (GANs)**, and so on.

## Entropy

Let's begin with the fundamental measure. The entropy of an independent vector is defined as:

$$ H(X) = -\sum_{i=1}^n P(X_i) logP(X_i) $$ 

Usually, the base of the log is taken as either $2$ or $e$.

## Relative entropy

The relative entropy **between two vectors** $X$ and $Y$ is defined as:

$$ D(X,Y) = -\sum_{i=1}^n X_i log(\frac{X_i}{Y_i}) $$ 

Since the equation involves (element-wise) ratio as well as logarithm, we must make sure to check for the zeros.

Here we'll focus on a quite important aspect of statistical learning. This lesson is advanced and can be reasonably skipped if needed.
# Introduction

We can easily compare a couple of scalar values by their difference or a ratio. Similarly, we can compare the two vectors by taking the L1 or L2 norm.

To extend this notion of divergence between a couple of distributions requires some better measures, though. There are several real-world applications where we need to find the similarity (or difference) between two distributions. For example, text comparison between two sequences in **bioinformatics**, text comparison in **Natural Language Processing (NLP)**, comparison of generated images by **Generative Adversarial Networks (GANs)**, and so on.

# Entropy

Let's begin with the fundamental measure. The entropy of an independent vector is defined as:

$$ H(X) = -\sum_{i=1}^n P(X_i) logP(X_i) $$ 

Usually, the base of the log is taken as either $2$ or $e$.

# Relative entropy

The relative entropy **between two vectors** $X$ and $Y$ is defined as:

$$ D(X,Y) = -\sum_{i=1}^n X_i log(\frac{X_i}{Y_i}) $$ 

Since the equation involves (element-wise) ratio as well as logarithm, we must make sure to check for the zeros.

Learn how we can calculate divergence measures in JAX.

Introduction

JAX Programming Model

Linear Algebra

Random Variables and Distributions

JAX Ecosystem

Project: GAN Using the JAX ecosystem

Appendix

Divergence Measures

Introduction

Entropy

Relative entropy