Linear hyperbolic PDEs with non-commutative time

TL;DR

This paper investigates linear hyperbolic PDEs with non-local, non-commutative time components, establishing solution existence, analyzing acausal effects, and connecting findings to quantum field theories on noncommutative Minkowski space.

Contribution

It introduces a method to construct solutions for non-local hyperbolic equations with non-commutative time, preserving hyperbolic properties and analyzing scattering in this context.

Findings

Unique advanced/retarded solutions constructed for small coupling.

Acausal effects are well-controlled despite non-locality.

Scattering operator describes the impact of non-local terms.

Abstract

Motivated by wave or Dirac equations on noncommutative deformations of Minkowski space, linear integro-differential equations of the form $(D+\lambda W)f=0$ are studied, where $D$ is a normal or prenormal hyperbolic differential operator on ${\mathbb R}^n$, $\lambda\in\mathbb C$ is a coupling constant, and $W$ is a regular integral operator with compactly supported kernel. In particular, $W$ can be non-local in time, so that a Hamiltonian formulation is not possible. It is shown that for sufficiently small $|\lambda|$, the hyperbolic character of $D$ is essentially preserved. Unique advanced/retarded fundamental solutions are constructed by means of a convergent expansion in $\lambda$, and the solution spaces are analyzed. It is shown that the acausal behavior of the solutions is well-controlled, but the Cauchy problem is ill-posed in general. Nonetheless, a scattering operator can be calculated which describes the effect of $W$ on the space of solutions of $D$. It is also described how these structures occur in the context of noncommutative Minkowski space, and how the results obtained here can be used for the analysis of classical and quantum field theories on such spaces.