Path Integrals In Quantum Mechanics, Statistics, Polymer Physics, And Financial Markets (5Th Edition)
量子力学,统计学,高分子物理和金融市场中的路径积分(第5版)
In this paper the fundamental concepts and methods of the Feynman path integrals are presented. Their applications are explained by harmonic oscillator as an example.
本文介绍了费曼路径积分的基本概念和方法,并以谐振子为例说明了它的应用。
Functional integration successfully entered physics as path integrals in the 1942 Ph. D. dissertation of Richard P. Feynman, but it made no sense at all as a mathematical definition.
职能的综合在理查页范曼的1942哲学博士长篇论文成功进入物理学作为道路积分,但是它确实没有意义作为一个数学定义。
This paper summarizes the study on options pricing in view of quantum finance, such as the path integrals approach, the gauge theory of arbitrage, and the quantum model of binomial option pricing.
综述了新兴的量子金融理论在期权定价上的应用,包括量子力学路径积分方法和虚拟套利动态测量理论,以及二项式期权定价的量子模型。
This paper summarizes the study on options pricing in view of quantum finance, such as the path integrals approach, the gauge theory of arbitrage, and the quantum model of binomial option pricing.
综述了新兴的量子金融理论在期权定价上的应用,包括量子力学路径积分方法和虚拟套利动态测量理论,以及二项式期权定价的量子模型。
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