Weak well-posedness of energy solutions to singular SDEs with supercritical distributional drift
Abstract
We study stochastic differential equations with additive noise and distributional drift on Td or Rd and d ≥slant 2. We work in a scaling-supercritical regime using energy solutions and recent ideas for generators of singular stochastic partial differential equations. We mainly focus on divergence-free drift, but allow for scaling-critical non-divergence free perturbations. In the time-dependent divergence-free case we roughly speaking prove weak well-posedness of energy solutions with initial law μ Leb for drift b ∈ LpT B-γp, 1 with p ∈ (2, ∞] and p ≥slant 21 -γ. For time-independent b we show weak well-posedness of energy solutions with initial law μ Leb under certain structural assumptions on b which allow local singularities such that b B-12 d/(d-2), 2, meaning that for any p > 2 in sufficiently high dimension there exists b B-1p, 2 such that weak well-posedness holds for energy solutions with drift b.
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