Uniqueness for stochastic differential equations in Hilbert spaces with irregular drift
Abstract
We present a versatile framework to study strong existence and uniqueness for stochastic differential equations (SDEs) in Hilbert spaces with irregular drift. We consider an SDE in a separable Hilbert space H equation* dXt= (A Xt + b(Xt))dt +(-A)-γ/2dWt, X0=x0 ∈ H, equation* where A is a self-adjoint negative definite operator with purely atomic spectrum, W is a cylindrical Wiener process, b is α-H\"older continuous function H H, and a nonnegative parameter γ such that the stochastic convolution takes values in H. We show that this equation has a unique strong solution provided that α > α*(γ), with an explicit function α* that takes values in (0,1) for all γ∈[0,3). This substantially extends the seminal work of Da Prato and Flandoli (2010) as no structural assumption on b is imposed. The range of admissible α is also extended. To obtain this result, we do not use infinite-dimensional Kolmogorov equations but instead develop a new technique combining L\e's theory of stochastic sewing in Hilbert spaces, Gaussian analysis, and a method of Lasry and Lions for approximation in Hilbert spaces.
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