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The content in this book is not exclusive to the graduate level. The content covered in this text is commonly used and covered at the graduate level, though. Anyone with calculus and linear algebra should be well equipped to read this book. The more background you have in mathematics the better, of course.
Shoutout to Yann and Adam. I consulted with them briefly on this book.
Yann has a PhD in Cosmology and can be found here: / yann_le_du
Adam is a PhD student in Solid State Physics and can be found here: / fermion_adam
Yann mentioned that the book was a good overview, but needed more exercises.
Adam mentioned that the book was missing quite a few topics needed at the research and PhD level such as group/representation theory for physics and Sobolev spaces for engineering. He mentioned that it was sufficient at the master's level.
Thank the both of you very much.
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Higher Mathematics for Physics and Engineering by Shima and Nakayama: amzn.to/3w25l2p
Functional Analysis by Shima: amzn.to/3SlnXlq
Advanced Engineering Mathematics by Kreyszig: amzn.to/3Oysnoh
Engineering Mathematics by Stroud and Booth: amzn.to/493GPwv
Advanced Engineering Mathematics by Stroud and Booth: amzn.to/3SPsIFD
Basic Algebra I by Jacobson: amzn.to/3SNJHbl
Basic Algebra II by Jacobson (This is where the review from the grandfather mentioned in the previous video is located): amzn.to/3SriucV
Mathematical Physics by Hassani: amzn.to/49nF7Wz
Timestamps:
0:00 A little about the book
0:40 Contents
2:26 The book itself
4:14 What I don't like about the book
6:40 Motivation for the Lebesgue Integral
8:52 Outro
Негізгі бет Ғылым және технология Higher Mathematics for Physics and Engineering - Shima and Nakayama
Пікірлер: 12