Regularity of stochastic differential equations on the Wiener space by coupling
Abstract
Using the coupling method introduced in Geiss:Ylinen:21, we investigate regularity properties of stochastic differential equations, where we consider the Lipschitz case in d and allow for H\"older continuity of the diffusion coefficient of scalar valued stochastic differential equations. Two cases of the coupling method are of special interest: The uniform coupling to treat the Malliavin Sobolev space 1,2 and real interpolation spaces, and secondly a cut-off coupling to treat the Lp-variation of backward stochastic differential equations where the forward process is the investigated stochastic differential equation.
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