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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

Working with the ConvNet architecture

Now that we know all the different components that make up a ConvNet, we can put it all together and see how to construct a deep CNN. In this section, we will build a full architecture and observe how forward propagation works and how we decide the depth of the network, the number of kernels to apply, when and why to use pooling, and so on. But before we dive in, let's explore some of the ways in which CNNs differ from FNNs. They are as follows:

  • The neurons in CNNs have local connectivity, which means that each neuron in a successive layer receives input from a small local group of pixels from an image, instead of receiving the entire image, as a feedforward neural network (FNN) would.
  • Each neuron in the layer of a CNN has the same weight parameters.
  • The layers in CNNs can be normalized.
  • CNNs are translation invariant, which allows us...
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