English

Wave equations with non-commutative space and time

Mathematical Physics 2015-04-07 v1 High Energy Physics - Theory math.MP

Abstract

The behaviour of solutions to the partial differential equation (D+λW)fλ=0(D + \lambda W)f_\lambda = 0 is discussed, where DD is a normal hyperbolic partial differential operator, or pre-normal hyperbolic operator, on nn-dimensional Minkowski spacetime. The potential term WW is a C0C_0^\infty kernel operator which, in general, will be non-local in time, and λ\lambda is a complex parameter. A result is presented which states that there are unique advanced and retarded Green's operators for this partial differential equation if λ|\lambda| is small enough (and also for a larger set of λ\lambda values). Moreover, a scattering operator can be defined if the λ\lambda values admit advanced and retarded Green operators. In general, however, the Cauchy-problem will be ill-posed, and examples will be given to that effect. It will also be explained that potential terms arising from non-commutative products on function spaces can be approximated by C0C_0^\infty kernel operators and that, thereby, scattering by a non-commutative potential can be investigated, also when the solution spaces are (2nd) quantized. Furthermore, a discussion will be given which links the scattering transformations, which thereby arise from non-commutative potentials, to observables of quantum fields on non-commutative spacetimes through "Bogoliubov's formula". In particular, this helps to shed light on the question how observables arise for quantum fields on Lorentzian spectral geometries.

Keywords

Cite

@article{arxiv.1504.01115,
  title  = {Wave equations with non-commutative space and time},
  author = {Rainer Verch},
  journal= {arXiv preprint arXiv:1504.01115},
  year   = {2015}
}

Comments

Latex2e, 18 pp. Contribution to the proceedings of the conference "Quantum Mathematical Physics" (Regensburg, October 2014)

R2 v1 2026-06-22T09:10:18.617Z