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Autores principales: Hughes, Thomas, Ortgiese, Marcel
Formato: Preprint
Publicado: 2026
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Acceso en línea:https://arxiv.org/abs/2603.29442
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author Hughes, Thomas
Ortgiese, Marcel
author_facet Hughes, Thomas
Ortgiese, Marcel
contents We consider non-negative solutions to some infinite-dimensional SDEs on $\mathbb{Z}^d$ with Hölder continuous noise coefficients. We prove that if the Hölder exponent is less than $1/2$, solutions are compactly supported for almost all times, a variant of the classical compact support property for SPDEs. Our results imply that the instantaneous propagation of supports for superprocesses associated to discontinuous spatial motions is effectively sharp. We also show in a special case that the set of times when the support is arbitrarily large is dense. The proof uses a general approach which we expect can be applied to prove similar results for non-local SPDEs. It is based on an analysis of the excursions and zero sets of semimartingales whose quadratic variation satisfies a certain lower bound. As a corollary of our method, we show that the zero sets of non-negative solutions to some simple one-dimensional SDEs have positive Lebesgue measure, despite the absence of "sticky" dynamics.
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institution arXiv
publishDate 2026
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spellingShingle A compact support property for infinite-dimensional SDEs with Hölder continuous coefficients
Hughes, Thomas
Ortgiese, Marcel
Probability
We consider non-negative solutions to some infinite-dimensional SDEs on $\mathbb{Z}^d$ with Hölder continuous noise coefficients. We prove that if the Hölder exponent is less than $1/2$, solutions are compactly supported for almost all times, a variant of the classical compact support property for SPDEs. Our results imply that the instantaneous propagation of supports for superprocesses associated to discontinuous spatial motions is effectively sharp. We also show in a special case that the set of times when the support is arbitrarily large is dense. The proof uses a general approach which we expect can be applied to prove similar results for non-local SPDEs. It is based on an analysis of the excursions and zero sets of semimartingales whose quadratic variation satisfies a certain lower bound. As a corollary of our method, we show that the zero sets of non-negative solutions to some simple one-dimensional SDEs have positive Lebesgue measure, despite the absence of "sticky" dynamics.
title A compact support property for infinite-dimensional SDEs with Hölder continuous coefficients
topic Probability
url https://arxiv.org/abs/2603.29442