Quantum mechanical books for mathematicians

Question

I'm a mathematician. I have good knowledge of superior analysis, distribution theory, Hilbert spaces, Sobolev spaces, and applications to PDE theory. I also have good knowledge of differential geometry. I would like to study the Semiclassic Analysis, but perhaps I must first study the foundations of quantum mechanics. So I would like to know what book you recommend me to begin studying quantum mechanics. I'm primarily interested in a mathematical point of view. I have seen some books of this type, but I would like to have some other opinion.

Thanks for every reply

@Masacroso, certainly in spirit, yes, but since that question was 6 years old, there are newer books available. — Paul, Jul 06 '17 at 22:12
@Paul yes, for this question seems very appropiate. I will quit the close vote. But I will leave the link to the old question. — , Jul 06 '17 at 22:12
I quite liked Brian Hall's newish book Quantum Theory for Mathematicians; Teschl (mentioned below) wasn't to my taste. I'd suggest browsing in these options to get a feel for their varying emphases and proximity to the physics. — symplectomorphic, Jul 07 '17 at 05:24
I'm not sure how useful is this for you, but I'd also use as a reference a good quality textbook for physicists, like Claude Cohen-Tannoudji's book. I think it is useful to develop a bit of physicist intuition when learning quantum mechanics. As a physicist, when I try to understand mathematics concepts, I usually try to look beyond the books "for physicists" like the "math methods" books. They often leave out important discussions on the meaning of the mathematical concepts and feel more like cookbooks. — user3653831, Jul 07 '17 at 09:27
@KCd Probably better to say advanced analysis (not basic courses): mainly functional analysis, distribution theory etc. — user288972, Jul 07 '17 at 10:12
Similar questions asked on Physics: https://physics.stackexchange.com/q/22409, https://physics.stackexchange.com/q/14377/ & https://physics.stackexchange.com/q/210812/ — Kyle Kanos, Jul 07 '17 at 12:17

score 13 · Answer 1 · answered Jul 06 '17 at 22:06

13

Here is a new book, freely available for now, that might be what you are looking for.

http://www.math.columbia.edu/~woit/QM/qmbook.pdf

answered Jul 06 '17 at 22:06

Paul

8,314

score 10 · Answer 2 · answered Jul 06 '17 at 22:24

10

I would recommend the book Quantum Mechanics for Mathematicians by Leon A. Takhtajan published by AMS. I cannot say much about this book, except some anecdote: I bought this book two years ago before beginning my bachelor studies in mathematics. It is on my shelf since then and sometimes I take a look at a few pages. Two years ago, I understood nothing, and the book is kind of a measure, how my math skills grew. Indeed, now I can have a look at it and actually understand whats going on in some parts. The thing is, it uses all the branches you've mentioned. Especially differential geometry and functional analysis. So it is quite advanced, but highly formal and definitely for mathematicians.

answered Jul 06 '17 at 22:24

TheGeekGreek

8,158

I noticed the same thing. It's one of the books I've seen. – user288972 Jul 06 '17 at 22:38
1

This book (and particularly the mathematical prerequisite) has been the subject of this question https://math.stackexchange.com/questions/588541/takhtajans-quantum-mechanics-for-mathematicians?rq=1. – Arnaud D. Jul 07 '17 at 08:08
@ArnaudD. Thank you. Very nice! – TheGeekGreek Jul 07 '17 at 08:23

score 6 · Answer 3 · answered Jul 07 '17 at 01:33

As a physics student, I used this text in a class that was half mathematicians and half physicists:

Teschl, Gerald. Mathematical Methods in Quantum Mechanics: With Applications to Schrödinger Operators (2^nd ed.). Providence, R.I.: American Mathematical Society, 2014.

score 1 · Answer 4 · answered Jul 07 '17 at 04:40

1

Perhaps Frankel's The Geometry of Physics, An Introduction, although this may not be an exact match for your intention.

answered Jul 07 '17 at 04:40

Eric Towers

70,953

Kabir Munjal · Answer 5 · 2023-08-16T20:56:41.773

I will recommend few books and lectures on Quantum mechanics and quantum field theory from a mathematical perspective

A. Alekseev lectures on Quantum mechanics and Quantum field theory for mathematicians will give a good introductory taste for quantum theory, as you told you are from a mathematical background. Saurav Chatterjee notes on Introduction to quantum field theory for mathematicans will also be a good one for starting point as well.

Quantum Mechanics for mathematicians by A Leon Takhtajan.

Quantum Theory for mathematicians by Brian C. Hall.

Spectral Theory and Quantum Mechanics by Valter Morretti.

Quantum Field theory for mathematicians by Robert Ticciati.

Towards the mathematics of quantum field theory by Frederic Paugam.

Mathematical Methods in Quantum Mechanics: With Applications to Schrödinger Operators is also mentioned in the answer box as well

The book Foundations of Quantum Theory: From Classical concepts to Operator Algebra by Klaas Landsman is available free on Google books.

Also one book that I should add one is the book, A Combinatorial perspective on Quantum Field theory by Karen Yeats This one is a brief book dicussing the combinatorial inclination of the subject of Quantum Field theory, pdf format is also available, it is ought to be research oriented.

https://www.math.uwaterloo.ca/~kayeats/teaching/co739_w18/A+Combinatorial+Perspective+on+Quantum+F.pdf

Thanks

Quantum mechanical books for mathematicians

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