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Lectures on Quantum Mechanics: A Primer for Mathematicians

✍ Scribed by Philip L. Bowers

Publisher
Cambridge University Press
Year
2020
Tongue
English
Leaves
584
Category
Library
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✦ Synopsis

Quantum mechanics is one of the principle pillars of modern physics. It also remains a topic of great interest to mathematicians. Since its discovery it has inspired and been inspired by many topics within modern mathematics, including functional analysis and operator algebras, Lie groups, Lie algebras and their representations, principle bundles, distribution theory, and much more. Written with beginning graduate students in mathematics in mind, this book provides a thorough treatment of (nonrelativistic) quantum mechanics in a style that is leisurely, without the usual theorem-proof grammar of pure mathematics, while remaining mathematically honest. The author takes the time to fully develop the required mathematics and employs a consistent mathematical presentation to clarify the often-confusing notation of physics texts. Along the way the reader encounters several topics requiring more advanced mathematics than found in many discussions of the subject, making for a fascinating course in how mathematics and physics interact.

✦ Table of Contents

Cover
Frontmatter
Contents
Preface
Prolegomenon
1 - The Harmonic Oscillator- Classical versus Quantum
2 - The Mathematical Structure of Quantum Mechanics
3 - Observables and Expectation Values
4 - The Projection Postulate Examined
5 - Rigged Hilbert Space and the Dirac Calculus
6 - A Review of Classical Mechanics
7 - Hamilton–Jacobi Theory βˆ—
8 - Classical Mechanics Regain’d
9 - Wave Mechanics I- Heisenberg Uncertainty
10 - Wave Mechanics II- The Fourier Transform
11 - Wave Mechanics III- The Quantum Oscillator
12 - Angular Momentum I- Basics
13 - Angular Momentum II- Representations of su(2)
14 - Angular Momentum III- The Central Force Problem
15 - Wave Mechanics IV- The Hydrogenic Potential
16 - Wave Mechanics V- Hidden Symmetry Revealed
17 - Wave Mechanics VI- Hidden Symmetry Solved
18 - Angular Momentum IV- Addition Rules and Spin
19 - Wave Mechanics VII- Pauli’s Spinor Theory
20 - Clifford Algebras and Spin Representations βˆ—
21 - Many-Particle Quantum Systems
22 - The EPR Argument and Bell’s Inequalities
23 - Ensembles and Density Operators
24 - Bosons and Fermions
25 - The Fock Space for Indistinguishable Quanta
26 - An Introduction to Quantum Statistical Mechanics
27 - Quantum Dynamics
28 - Unitary Representations and Conservation Laws
29 - The Feynman Formulation of Quantum Mechanics
30 - A Mathematical Interlude- Gaussian Integrals
31 - Evaluating Path Integrals I
32 - Evaluating Path Integrals II
Epilogue
Resources for Individual Exploration
Bibliography
Index

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