时空非共时性的随机起源

Michele Arzano, Folkert Kuipers
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引用次数: 0

摘要

我们从量子力学换向关系的路径积分公式出发,提出了时空非换向性的随机解释。我们讨论了时空的(非)换向性如何与路径积分公式中路径的连续性或不连续性存在内在联系。利用维纳过程,我们证明连续路径导致换向时空,而不连续路径对应于非换向时空结构。作为一个例子,我们引入了非连续路径,从中可以得到 $\kappa$-Minkowski 时空交换器。我们以$\kappa$-Poincar\'e 代数为例,展示了这些修正如何与平移发生器的变形作用相关联。我们的研究结果表明,时空的基本离散性可以被理解为时空的交换性。
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A Stochastic Origin of Spacetime Non-Commutativity
We propose a stochastic interpretation of spacetime non-commutativity starting from the path integral formulation of quantum mechanical commutation relations. We discuss how the (non-)commutativity of spacetime is inherently related to the continuity or discontinuity of paths in the path integral formulation. Utilizing Wiener processes, we demonstrate that continuous paths lead to commutative spacetime, whereas discontinuous paths correspond to non-commutative spacetime structures. As an example we introduce discontinuous paths from which the $\kappa$-Minkowski spacetime commutators can be obtained. Moreover we focus on modifications of the Leibniz rule for differentials acting on discontinuous trajectories. We show how these can be related to the deformed action of translation generators focusing, as a working example, on the $\kappa$-Poincar\'e algebra. Our findings suggest that spacetime non-commutativity can be understood as a result of fundamental discreteness of spacetime.
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