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Hauptverfasser: Chen, Hongyi, Lee, Cheuk Yin
Format: Preprint
Veröffentlicht: 2025
Schlagworte:
Online-Zugang:https://arxiv.org/abs/2508.13671
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author Chen, Hongyi
Lee, Cheuk Yin
author_facet Chen, Hongyi
Lee, Cheuk Yin
contents For the $1+1$ dimensional damped stochastic Klein-Gordon equation, we show that random singularities associated with the law of the iterated logarithm exist and propogate in the same way as the stochastic wave equation. This provides evidence for possible connections to microlocal analysis, ie. the exact regularity and singularities described in this paper should admit wavefront set type descriptions whose propagation is determined by the highest order terms of the linear operator. Despite the results being exactly the same as those of the wave equation, our proofs are significantly different than the proofs for the wave equation. Miraculously, proving our results for the critically damped equation implies them for the general equation, which significantly simplifies the problem. Even after this simplification, many important parts of the proof are significantly different than (and we think are more intuitive from the PDE viewpoint compared to) existing proofs for the wave equation.
format Preprint
id arxiv_https___arxiv_org_abs_2508_13671
institution arXiv
publishDate 2025
record_format arxiv
spellingShingle Propagation of Singularities for the Damped Stochastic Klein-Gordon Equation
Chen, Hongyi
Lee, Cheuk Yin
Probability
Analysis of PDEs
60H15, 60G17
For the $1+1$ dimensional damped stochastic Klein-Gordon equation, we show that random singularities associated with the law of the iterated logarithm exist and propogate in the same way as the stochastic wave equation. This provides evidence for possible connections to microlocal analysis, ie. the exact regularity and singularities described in this paper should admit wavefront set type descriptions whose propagation is determined by the highest order terms of the linear operator. Despite the results being exactly the same as those of the wave equation, our proofs are significantly different than the proofs for the wave equation. Miraculously, proving our results for the critically damped equation implies them for the general equation, which significantly simplifies the problem. Even after this simplification, many important parts of the proof are significantly different than (and we think are more intuitive from the PDE viewpoint compared to) existing proofs for the wave equation.
title Propagation of Singularities for the Damped Stochastic Klein-Gordon Equation
topic Probability
Analysis of PDEs
60H15, 60G17
url https://arxiv.org/abs/2508.13671