Add to ORKGThis paper offers an existence result for finite dimensional stochastic differential inclusions with maximal monotone drift and diffusion terms. Kravets studied only set-valued drifts in [5], whereas Motyl [4] additionally observed set-valued diffusions in an infinite dimensional context. In the proof we make use of the Yosida approximation of maximal monotone operators to achieve stochastic differential equations which are solvable by a theorem of Krylov and Rozovskij [7]. The selection property is verified with certain properties of the considered set-valued maps. Concerning Lipschitz continuous set-valued diffusion terms, uniqueness holds. At last two examples for application are given
AbstractPartial differential inclusions of the form ut′∈LFGu+cu and ψ∈LFGu+cu, where LFG is a unifor...
The paper deals with one-dimensional homogeneous stochastic differential inclusions without drift wi...
AbstractThis paper develops the stochastic calculus of variations for Hilbert space-valued solutions...
This paper offers an existence result for finite dimensional stochastic differential inclusions with...
The paper deals with one-dimensional homogeneous stochastic differential inclusions without drift wi...
Von der Professur Stochastik der Fakultät für Mathematik der Technischen Universität Chemnitz werden...
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AbstractPartial differential inclusions of the form ut′∈LFGu+cu and ψ∈LFGu+cu, where LFG is a unifor...
The paper deals with one-dimensional homogeneous stochastic differential inclusions without drift wi...
AbstractThis paper develops the stochastic calculus of variations for Hilbert space-valued solutions...
This paper offers an existence result for finite dimensional stochastic differential inclusions with...
The paper deals with one-dimensional homogeneous stochastic differential inclusions without drift wi...
Von der Professur Stochastik der Fakultät für Mathematik der Technischen Universität Chemnitz werden...
We prove existence and uniqueness of strong solutions for a class of semilinear stochastic evolution...
We prove global well-posedness for a class of dissipative semilinear stochastic evolution equations ...
Stephan M. Yosida approximations for multivalued stochastic differential equations on Banach spaces ...
We study a class of differential inclusions involving maximal monotone relations, which cover a hug...
AbstractDeterministic oscillations with bilinear hysteresis are governed by a multivalued differenti...
We prove pathwise uniqueness for a class of stochastic differential equations (SDE) on a Hilbert spa...
AbstractConnections between weak solutions of stochastic differential inclusions and solutions of pa...
Some results related to stochastic differential equations with reflecting boundary conditions (SDER)...
Some results on the relationship of the solutions of a stochastic di erential inclusion and the corr...
AbstractPartial differential inclusions of the form ut′∈LFGu+cu and ψ∈LFGu+cu, where LFG is a unifor...
The paper deals with one-dimensional homogeneous stochastic differential inclusions without drift wi...
AbstractThis paper develops the stochastic calculus of variations for Hilbert space-valued solutions...