The Sobolev Wavefront Set of the Causal Propagator in Finite Regularity

Publikation: Arbeitspapier/PreprintPreprint

Autoren

  • Yafet Sanchez Sanchez
  • Elmar Schrohe

Organisationseinheiten

Forschungs-netzwerk anzeigen

Details

OriginalspracheEnglisch
PublikationsstatusElektronisch veröffentlicht (E-Pub) - 10 März 2022

Abstract

In this paper we estimate the Sobolev wavefront set for the causal propagator \(K_G\) of the Klein-Gordon equation in an ultrastatic spacetime when the regularity of the metric is \(C^\tau\) with \(\tau>2\) and \(C^{1,1}\). Our main tools are a propagation of singularities result for non-smooth pseudodifferential operators and eigenvalue asymptotics for elliptic operators of low regularity.

Zitieren

The Sobolev Wavefront Set of the Causal Propagator in Finite Regularity. / Sanchez, Yafet Sanchez; Schrohe, Elmar.
2022.

Publikation: Arbeitspapier/PreprintPreprint

Sanchez YS, Schrohe E. The Sobolev Wavefront Set of the Causal Propagator in Finite Regularity. 2022 Mär 10. Epub 2022 Mär 10. doi: 10.48550/arXiv.2203.04362
Sanchez, Yafet Sanchez ; Schrohe, Elmar. / The Sobolev Wavefront Set of the Causal Propagator in Finite Regularity. 2022.
Download
@techreport{f1823d65a90f43f89962fb3bb7639b73,
title = "The Sobolev Wavefront Set of the Causal Propagator in Finite Regularity",
abstract = "In this paper we estimate the Sobolev wavefront set for the causal propagator \(K_G\) of the Klein-Gordon equation in an ultrastatic spacetime when the regularity of the metric is \(C^\tau\) with \(\tau>2\) and \(C^{1,1}\). Our main tools are a propagation of singularities result for non-smooth pseudodifferential operators and eigenvalue asymptotics for elliptic operators of low regularity.",
keywords = "math.AP, math-ph, math.MP, 58J47",
author = "Sanchez, {Yafet Sanchez} and Elmar Schrohe",
year = "2022",
month = mar,
day = "10",
doi = "10.48550/arXiv.2203.04362",
language = "English",
type = "WorkingPaper",

}

Download

TY - UNPB

T1 - The Sobolev Wavefront Set of the Causal Propagator in Finite Regularity

AU - Sanchez, Yafet Sanchez

AU - Schrohe, Elmar

PY - 2022/3/10

Y1 - 2022/3/10

N2 - In this paper we estimate the Sobolev wavefront set for the causal propagator \(K_G\) of the Klein-Gordon equation in an ultrastatic spacetime when the regularity of the metric is \(C^\tau\) with \(\tau>2\) and \(C^{1,1}\). Our main tools are a propagation of singularities result for non-smooth pseudodifferential operators and eigenvalue asymptotics for elliptic operators of low regularity.

AB - In this paper we estimate the Sobolev wavefront set for the causal propagator \(K_G\) of the Klein-Gordon equation in an ultrastatic spacetime when the regularity of the metric is \(C^\tau\) with \(\tau>2\) and \(C^{1,1}\). Our main tools are a propagation of singularities result for non-smooth pseudodifferential operators and eigenvalue asymptotics for elliptic operators of low regularity.

KW - math.AP

KW - math-ph

KW - math.MP

KW - 58J47

U2 - 10.48550/arXiv.2203.04362

DO - 10.48550/arXiv.2203.04362

M3 - Preprint

BT - The Sobolev Wavefront Set of the Causal Propagator in Finite Regularity

ER -