Existence, uniqueness and regularity for the stochastic Ericksen-Leslie equation

Anne De Bouard; Antoine Hocquet; Andreas Prohl

doi:10.1088/1361-6544/ac022e

Existence, uniqueness and regularity for the stochastic Ericksen-Leslie equation

Anne De Bouard
, Antoine Hocquet
, Andreas Prohl

TU Berlin
University of Tübingen

Research output: Contribution to journal › Article › peer-review

Abstract

We investigate existence and uniqueness for the liquid crystal flow driven by colored noise on the two-dimensional torus. After giving a natural uniqueness criterion, we prove local solvability in L p -based spaces, for every p > 2. Thanks to a bootstrap principle together with a Gyöngy-Krylov-type compactness argument, this will ultimately lead us to prove the existence of a particular class of global solutions which are partially regular, strong in the probabilistic sense, and taking values in the 'critical space' L 2 H 1.

Original language	English
Pages (from-to)	4057-4114
Number of pages	58
Journal	Nonlinearity
Volume	34
Issue number	6
DOIs	https://doi.org/10.1088/1361-6544/ac022e
Publication status	Published - 1 Jun 2021

Keywords

harmonic maps
liquid crystals
nonlinear parabolic equations
stochastic partial differential equations

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10.1088/1361-6544/ac022e

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title = "Existence, uniqueness and regularity for the stochastic Ericksen-Leslie equation",

abstract = "We investigate existence and uniqueness for the liquid crystal flow driven by colored noise on the two-dimensional torus. After giving a natural uniqueness criterion, we prove local solvability in L p -based spaces, for every p > 2. Thanks to a bootstrap principle together with a Gy{\"o}ngy-Krylov-type compactness argument, this will ultimately lead us to prove the existence of a particular class of global solutions which are partially regular, strong in the probabilistic sense, and taking values in the 'critical space' L 2 H 1.",

keywords = "harmonic maps, liquid crystals, nonlinear parabolic equations, stochastic partial differential equations",

author = "\{De Bouard\}, Anne and Antoine Hocquet and Andreas Prohl",

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AU - De Bouard, Anne

AU - Hocquet, Antoine

AU - Prohl, Andreas

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N2 - We investigate existence and uniqueness for the liquid crystal flow driven by colored noise on the two-dimensional torus. After giving a natural uniqueness criterion, we prove local solvability in L p -based spaces, for every p > 2. Thanks to a bootstrap principle together with a Gyöngy-Krylov-type compactness argument, this will ultimately lead us to prove the existence of a particular class of global solutions which are partially regular, strong in the probabilistic sense, and taking values in the 'critical space' L 2 H 1.

AB - We investigate existence and uniqueness for the liquid crystal flow driven by colored noise on the two-dimensional torus. After giving a natural uniqueness criterion, we prove local solvability in L p -based spaces, for every p > 2. Thanks to a bootstrap principle together with a Gyöngy-Krylov-type compactness argument, this will ultimately lead us to prove the existence of a particular class of global solutions which are partially regular, strong in the probabilistic sense, and taking values in the 'critical space' L 2 H 1.

KW - harmonic maps

KW - liquid crystals

KW - nonlinear parabolic equations

KW - stochastic partial differential equations

U2 - 10.1088/1361-6544/ac022e

DO - 10.1088/1361-6544/ac022e

M3 - Article

AN - SCOPUS:85110519211

SN - 0951-7715

VL - 34

SP - 4057

EP - 4114

JO - Nonlinearity

JF - Nonlinearity

IS - 6

ER -

Existence, uniqueness and regularity for the stochastic Ericksen-Leslie equation

Abstract

Keywords

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