Convergence of stochastic integrals with applications to transport equations and conservation laws with noise

Abstract

Convergence of stochastic integrals driven by Wiener processes Wn, with Wn W almost surely in Ct, is crucial in analyzing SPDEs. Our focus is on the convergence of the form ∫0T Vn\, d Wn ∫0T V\, d W, where \Vn\ is bounded in Lp( × [0,T];X) for a Banach space X and some finite p > 2. This is challenging when Vn converges to V weakly in the temporal variable. We supply convergence results to handle stochastic integral limits when strong temporal convergence is lacking. A key tool is a uniform mean L1 time translation estimate on Vn, an estimate that is easily verified in many SPDEs. However, this estimate alone does not guarantee strong compactness of (ω,t) Vn(ω,t). Our findings, especially pertinent to equations exhibiting singular behavior, are substantiated by establishing several stability results for stochastic transport equations and conservation laws.

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