Stochastic equations with low regularity drifts
Abstract
By using the It\o-Tanaka trick, we prove the unique strong solvability as well as the gradient estimates for stochastic differential equations with irregular drifts in low regularity Lebesgue-H\"older space Lq(0,T; Cbα( Rd)) with α∈(0,1) and q∈ (2/(1+α),2). As applications, we show the unique weak and strong solvability for stochastic transport equations driven by the low regularity drift with q∈ (4/(2+α),2) as well as the local Lipschitz estimate for stochastic strong solutions.
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