2 + 1)维场理论中的卡西米尔能

Physics Pub Date : 2024-04-17 DOI:10.3390/physics6020040
M. Asorey, Claudio Iuliano, Fernando Ezquerro
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引用次数: 0

摘要

我们探讨了真空能对 (2 + 1) 维空间中大质量标量场的边界条件的依赖性。我们考虑了最简单的几何设置,即由两根同质平行线围成的二维空间,以便将其与非阿贝尔规规理论在 (2 + 1) 维中的卡西米尔能的非微扰行为进行比较。我们的研究结果表明存在两种边界条件,它们导致了卡西米尔能在大距离上的两种不同渐近指数衰减状态。这两个系列的区别在于边界条件涉及或不涉及两个边界的场行为之间的相互关系。非微扰数值模拟和分析论证表明,SU(2)规理论的迪里夏特边界条件存在这种指数衰减。要验证这种行为在其他类型的边界条件下是否有所改变,还需要进一步的数值工作。低温制度下的次主导修正与数值模拟非常相关,本文也对其进行了分析。
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Casimir Energy in (2 + 1)-Dimensional Field Theories
We explore the dependence of vacuum energy on the boundary conditions for massive scalar fields in (2 + 1)-dimensional spacetimes. We consider the simplest geometrical setup given by a two-dimensional space bounded by two homogeneous parallel wires in order to compare it with the non-perturbative behaviour of the Casimir energy for non-Abelian gauge theories in (2 + 1) dimensions. Our results show the existence of two types of boundary conditions which give rise to two different asymptotic exponential decay regimes of the Casimir energy at large distances. The two families are distinguished by the feature that the boundary conditions involve or not interrelations between the behaviour of the fields at the two boundaries. Non-perturbative numerical simulations and analytical arguments show such an exponential decay for Dirichlet boundary conditions of SU(2) gauge theories. The verification that this behaviour is modified for other types of boundary conditions requires further numerical work. Subdominant corrections in the low-temperature regime are very relevant for numerical simulations, and they are also analysed in this paper.
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