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Main Authors: Brué, Elia, Jin, Rui, Li, Yachun, Zhang, Deng
Format: Preprint
Published: 2023
Subjects:
Online Access:https://arxiv.org/abs/2309.09753
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author Brué, Elia
Jin, Rui
Li, Yachun
Zhang, Deng
author_facet Brué, Elia
Jin, Rui
Li, Yachun
Zhang, Deng
contents This paper concerns the forced stochastic Navier-Stokes equation driven by additive noise in the three dimensional Euclidean space. By constructing an appropriate forcing term, we prove that there exist distinct Leray solutions in the probabilistically weak sense. In particular, the joint uniqueness in law fails in the Leray class. The non-uniqueness also displays in the probabilistically strong sense in the local time regime, up to stopping times. Furthermore, we discuss the optimality from two different perspectives: sharpness of the hyper-viscous exponent and size of the external force. These results in particular yield that the Lions exponent is the sharp viscosity threshold for the uniqueness/non-uniqueness in law of Leray solutions. Our proof utilizes the self-similarity and instability programme developed by Jia Šverák [42,43] and Albritton-Brué-Colombo [1], together with the theory of martingale solutions including stability for non-metric spaces and gluing procedure.
format Preprint
id arxiv_https___arxiv_org_abs_2309_09753
institution arXiv
publishDate 2023
record_format arxiv
spellingShingle Non-uniqueness in law of Leray solutions to 3D forced stochastic Navier-Stokes equations
Brué, Elia
Jin, Rui
Li, Yachun
Zhang, Deng
Probability
60H15, 35Q30, 76D05
This paper concerns the forced stochastic Navier-Stokes equation driven by additive noise in the three dimensional Euclidean space. By constructing an appropriate forcing term, we prove that there exist distinct Leray solutions in the probabilistically weak sense. In particular, the joint uniqueness in law fails in the Leray class. The non-uniqueness also displays in the probabilistically strong sense in the local time regime, up to stopping times. Furthermore, we discuss the optimality from two different perspectives: sharpness of the hyper-viscous exponent and size of the external force. These results in particular yield that the Lions exponent is the sharp viscosity threshold for the uniqueness/non-uniqueness in law of Leray solutions. Our proof utilizes the self-similarity and instability programme developed by Jia Šverák [42,43] and Albritton-Brué-Colombo [1], together with the theory of martingale solutions including stability for non-metric spaces and gluing procedure.
title Non-uniqueness in law of Leray solutions to 3D forced stochastic Navier-Stokes equations
topic Probability
60H15, 35Q30, 76D05
url https://arxiv.org/abs/2309.09753