A Short Course on Quantum Mechanics and Methods of Quantization

From Classical Mechanics to Quantum Field Theory, A Tutorial Pub Date : 2015-09-23 DOI:10.1142/S0219887815600087

E. Ercolessi

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引用次数: 2

Abstract

These notes collect the lectures given by the author to the "XXIII International Workshop on Geometry and Physics" held in Granada (Spain) in September 2014. The first part of this paper aims at introducing a mathematical oriented reader to the realm of Quantum Mechanics (QM) and then to present the geometric structures that underline the mathematical formalism of QM which, contrary to what is usually done in Classical Mechanics (CM), are usually not taught in introductory courses. The mathematics related to Hilbert spaces and Differential Geometry are assumed to be known by the reader. In the second part, we concentrate on some quantization procedures, that are founded on the geometric structures of QM — as we have described them in the first part — and represent the ones that are more operatively used in modern theoretical physics. We will discuss first the so-called Coherent State Approach which, mainly complemented by "Feynman Path Integral Technique", is the method which is most widely used in quantum field theory. Finally, we will describe the "Weyl Quantization Approach" which is at the origin of modern tomographic techniques, originally used in optics and now in quantum information theory.

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量子力学与量子化方法短期课程

这些笔记收集了作者于2014年9月在西班牙格拉纳达举行的“第二十三届国际几何与物理研讨会”上的演讲。本文的第一部分旨在向面向数学的读者介绍量子力学(QM)的领域，然后介绍强调量子力学的数学形式的几何结构，这与通常在经典力学(CM)中所做的相反，通常不会在入门课程中教授。与希尔伯特空间和微分几何有关的数学假定为读者所知。在第二部分中，我们将集中讨论一些量子化过程，这些过程建立在量子力学的几何结构上——正如我们在第一部分中所描述的那样——并代表了在现代理论物理中更有效地使用的过程。我们将首先讨论所谓的相干态方法，它主要由“费曼路径积分技术”补充，是量子场论中应用最广泛的方法。最后，我们将描述“Weyl量化方法”，它是现代层析技术的起源，最初用于光学，现在用于量子信息理论。

本文章由计算机程序翻译，如有差异，请以英文原文为准。

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From Classical Mechanics to Quantum Field Theory, A Tutorial

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