Abstract
By extending to the stochastic setting the classical vanishing viscosity approach we prove the existence of suitably weak solutions of a class of nonlinear stochastic evolution equation of rate-independent type. Approximate solutions are obtained via viscous regularization. Upon properly rescaling time, these approximations converge to a parametrized martingale solution of the problem in rescaled time, where the rescaled noise is given by a general square-integrable cylindrical martingale with absolutely continuous quadratic variation. In absence of jumps, these are strong-in-time martingale solutions of the problem in the original, not rescaled time.
Original language | English |
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Article number | 110102 |
Journal | Journal of Functional Analysis |
Volume | 285 |
Issue number | 10 |
DOIs | |
Publication status | Published - 15 Nov 2023 |
Austrian Fields of Science 2012
- 101002 Analysis
Keywords
- Doubly nonlinear stochastic equations
- Martingale solutions
- Parametrized solutions
- Rate-independence