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Deep learning and physics [electronic resource]
- 作者: Tanaka, Akinori.
- 其他作者:
- 其他題名:
- Mathematical physics studies.
- 出版: Singapore : Springer Singapore :Imprint: Springer
- 叢書名: Mathematical physics studies,
- 主題: Physics--Data processing. , Machine learning. , Theoretical, Mathematical and Computational Physics. , Mathematical Physics. , Machine Learning.
- ISBN: 9789813361089 (electronic bk.) 、 9789813361072 (paper)
- FIND@SFXID: CGU
- 資料類型: 電子書
- 內容註: Chapter 1: Forewords: Machine learning and physics -- Part I Physical view of deep learning -- Chapter 2: Introduction to machine learning -- Chapter 3: Basics of neural networks -- Chapter 4: Advanced neural networks -- Chapter 5: Sampling -- Chapter 6: Unsupervised deep learning -- Part II Applications to physics -- Chapter 7: Inverse problems in physics -- Chapter 8: Detection of phase transition by machines -- Chapter 9: Dynamical systems and neural networks -- Chapter 10: Spinglass and neural networks -- Chapter 11: Quantum manybody systems, tensor networks and neural networks -- Chapter 12: Application to superstring theory -- Chapter 13: Epilogue -- Bibliography -- Index.
- 摘要註: What is deep learning for those who study physics? Is it completely different from physics? Or is it similar? In recent years, machine learning, including deep learning, has begun to be used in various physics studies. Why is that? Is knowing physics useful in machine learning? Conversely, is knowing machine learning useful in physics? This book is devoted to answers of these questions. Starting with basic ideas of physics, neural networks are derived naturally. And you can learn the concepts of deep learning through the words of physics. In fact, the foundation of machine learning can be attributed to physical concepts. Hamiltonians that determine physical systems characterize various machine learning structures. Statistical physics given by Hamiltonians defines machine learning by neural networks. Furthermore, solving inverse problems in physics through machine learning and generalization essentially provides progress and even revolutions in physics. For these reasons, in recent years interdisciplinary research in machine learning and physics has been expanding dramatically. This book is written for anyone who wants to learn, understand, and apply the relationship between deep learning/machine learning and physics. All that is needed to read this book are the basic concepts in physics: energy and Hamiltonians. The concepts of statistical mechanics and the bracket notation of quantum mechanics, which are explained in columns, are used to explain deep learning frameworks. We encourage you to explore this new active field of machine learning and physics, with this book as a map of the continent to be explored.
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讀者標籤:
- 系統號: 005544474 | 機讀編目格式