Chongyang Ren, Xicheng Zhang
Published 2024-01-25Version 1
In this paper we investigate the existence and uniqueness of weak solutions for kinetic stochastic differential equations with H\"older diffusion and unbounded singular drifts in Kato's class. Moreover, we also establish sharp two-sided estimates for the density of the solution. In particular, the drift $b$ can be in the mixed $L^q_tL^{p_1}_{x_1}L^{p_2}_{x_2}$ space with $\frac2q+\frac{d}{p_1}+\frac{3d}{p_2}<1$. As an application, we show the existence and uniqueness of weak solution to a second order singular interacting particle system in ${\mathbb R}^{d N}$.
Strong regularization by noise for kinetic SDEs
Heat kernel estimates for $Δ+Δ^{α/2}$ under gradient perturbation
Heat kernel estimates and intrinsic metric for random walks with general speed measure under degenerate conductances
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