The critical variational setting for stochastic evolution equations

Journal article (2024)

Authors

A. Agresti Institute of Science and Technology Austria
M.C. Veraar Analysis - EEMCS
Research Group
Analysis (EEMCS) (TU Delft)
Copyright: © 2024 A. Agresti, M.C. Veraar
DOI: https://doi.org/10.1007/s00440-023-01249-x
Stochastic partial differential equations Stochastic evolution equations Allen–Cahn equation Cahn–Hilliard equation Coercivity Critical nonlinearities Generalized Burgers equation Quasi- and semi-linear Swift–Hohenberg equation Tamed Navier–Stokes Variational methods
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Published Date

2024

Language

English

Faculty

Electrical Engineering, Mathematics and Computer Science

Department

Delft Institute of Applied Mathematics

Research Group

Analysis

Abstract

In this paper we introduce the critical variational setting for parabolic stochastic evolution equations of quasi- or semi-linear type. Our results improve many of the abstract results in the classical variational setting. In particular, we are able to replace the usual weak or local monotonicity condition by a more flexible local Lipschitz condition. Moreover, the usual growth conditions on the multiplicative noise are weakened considerably. Our new setting provides general conditions under which local and global existence and uniqueness hold. In addition, we prove continuous dependence on the initial data. We show that many classical SPDEs, which could not be covered by the classical variational setting, do fit in the critical variational setting. In particular, this is the case for the Cahn–Hilliard equation, tamed Navier–Stokes equations, and Allen–Cahn equation.