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Hands-On Mathematics for Deep Learning

You're reading from   Hands-On Mathematics for Deep Learning Build a solid mathematical foundation for training efficient deep neural networks

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Product type Paperback
Published in Jun 2020
Publisher Packt
ISBN-13 9781838647292
Length 364 pages
Edition 1st Edition
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Author (1):
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Jay Dawani Jay Dawani
Author Profile Icon Jay Dawani
Jay Dawani
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Table of Contents (19) Chapters Close

Preface 1. Section 1: Essential Mathematics for Deep Learning
2. Linear Algebra FREE CHAPTER 3. Vector Calculus 4. Probability and Statistics 5. Optimization 6. Graph Theory 7. Section 2: Essential Neural Networks
8. Linear Neural Networks 9. Feedforward Neural Networks 10. Regularization 11. Convolutional Neural Networks 12. Recurrent Neural Networks 13. Section 3: Advanced Deep Learning Concepts Simplified
14. Attention Mechanisms 15. Generative Models 16. Transfer and Meta Learning 17. Geometric Deep Learning 18. Other Books You May Enjoy

Mixture model networks

Now that we've seen a few examples of how GNNs work, let's go a step further and see how we can apply neural networks to meshes.

First, we use a patch that is defined at each point in a local system of d-dimensional pseudo-coordinates, , around x. This is referred to as a geodesic polar. On each of these coordinates, we apply a set of parametric kernels, , that produces local weights.

The kernels here differ in that they are Gaussian and not fixed, and are produced using the following equation:

These parameters ( and ) are trainable and learned.

A spatial convolution with a filter, g, can be defined as follows:

Here, is a feature at vertex i.

Previously, we mentioned geodesic polar coordinates, but what are they? Let's define them and find out. We can write them as follows:

Here, is the geodesic distance between i and j and is the...

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