量子统计力学中的Bogolyubov高斯测度

D. P. Sankovich
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引用次数: 0

摘要

在抽象集合上定义的函数积分方法的应用中,第一步是由维纳迈出的。最广泛地说,功能集成的思想是在费曼的著作中发展起来的。费曼连续积分为众多物理学家所熟知。除此之外,在量子物理学中还有另一种构造泛函积分的方法。这种方法是由Bogolyubov提出的。Bogolyubov的方法与量子统计物理相关,并且与概率论有天然的联系。我们回顾了关于量子系统统计理论中出现的一种特殊高斯测度的积分的一些数学结果。证明了玻色算子的时间积的吉布斯平衡平均可以表示为关于这个测度(Bogolyubov测度)的泛函积分。研究了该测度的一些性质。我们用Bogolyubov泛函积分的形式重写了许多粒子玻色系统的配分函数。
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Bogolyubov Gaussian Measure in Quantum Statistical Mechanics
The first steps in the application of methods for integrating functions defined on abstract sets were taken by Wiener. Most widely, the ideas of functional integration were developed in Feynman's works. The Feynman continual integral is well known to a wide community of physicists. Along with this, there is another approach to the construction of a functional integral in quantum physics. This approach was proposed by Bogolyubov. Bogolyubov's methods are relevant in quantum statistical physics, and have natural ties with probability theory. We review some mathematical results of integration with respect to a special Gaussian measure that arises in the statistical theory for quantum systems. It is shown that the Gibbs equilibrium averages of the chronological products of Bose operators can be represented as functional integrals with respect to this measure (the Bogolyubov measure). Some properties of this measure are studied. We rewrite partition function of many particle Bose systems in terms of Bogolyubov functional integral.
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