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Hauptverfasser: Cao, Wenping, Li, Yachun, Zhang, Deng
Format: Preprint
Veröffentlicht: 2024
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Online-Zugang:https://arxiv.org/abs/2408.05450
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author Cao, Wenping
Li, Yachun
Zhang, Deng
author_facet Cao, Wenping
Li, Yachun
Zhang, Deng
contents We are concerned with the 3D stochastic magnetohydrodynamic (MHD) equations driven by additive noise on torus. For arbitrarily prescribed divergence-free initial data in $L^{2}_x$, we construct infinitely many probabilistically strong and analitically weak solutions in the class $L^{r}_ΩL_{t}^γW_{x}^{s,p}$, where $r>1$ and $(s, γ, p)$ lie in a supercritical regime with respect to the the Ladyžhenskaya-Prodi-Serrin (LPS) criteria. In particular, we get the non-uniqueness of probabilistically strong solutions, which is sharp at one LPS endpoint space. Our proof utilizes intermittent flows which are different from those of Navier-Stokes equations and derives the non-uniqueness even in the high viscous and resistive regime beyond the Lions exponent 5/4. Furthermore, we prove that as the noise intensity tends to zero, the accumulation points of stochastic MHD solutions contain all deterministic solutions to MHD solutions, which include the recently constructed solutions in [28, 29] to deterministic MHD systems.
format Preprint
id arxiv_https___arxiv_org_abs_2408_05450
institution arXiv
publishDate 2024
record_format arxiv
spellingShingle Existence and non-uniqueness of probabilistically strong solutions to 3D stochastic magnetohydrodynamic equations
Cao, Wenping
Li, Yachun
Zhang, Deng
Analysis of PDEs
Probability
We are concerned with the 3D stochastic magnetohydrodynamic (MHD) equations driven by additive noise on torus. For arbitrarily prescribed divergence-free initial data in $L^{2}_x$, we construct infinitely many probabilistically strong and analitically weak solutions in the class $L^{r}_ΩL_{t}^γW_{x}^{s,p}$, where $r>1$ and $(s, γ, p)$ lie in a supercritical regime with respect to the the Ladyžhenskaya-Prodi-Serrin (LPS) criteria. In particular, we get the non-uniqueness of probabilistically strong solutions, which is sharp at one LPS endpoint space. Our proof utilizes intermittent flows which are different from those of Navier-Stokes equations and derives the non-uniqueness even in the high viscous and resistive regime beyond the Lions exponent 5/4. Furthermore, we prove that as the noise intensity tends to zero, the accumulation points of stochastic MHD solutions contain all deterministic solutions to MHD solutions, which include the recently constructed solutions in [28, 29] to deterministic MHD systems.
title Existence and non-uniqueness of probabilistically strong solutions to 3D stochastic magnetohydrodynamic equations
topic Analysis of PDEs
Probability
url https://arxiv.org/abs/2408.05450