SDEs with subcritical Lebesgue--H\"older drift and driven by α-stable processes
Abstract
We obtain the unique weak and strong solvability for time inhomogeneous stochastic differential equations with the drift in subcritical Lebesgue--H\"older spaces Lp([0,T]; Cbβ( Rd; Rd)) and driven by α-stable processes for α∈ (0,2). The weak well-posedness is derived for β∈ (0,1), α+β>1 and p>α/(α+β-1) through Prohorov's theorem, Skorohod's representation and the regularity estimates of solutions for a class of fractional parabolic partial differential equations. The pathwise uniqueness and Davie's type uniqueness are proved for β>1-α/2 by using It\o--Tanaka's trick. Moreover, we give a counterexample to the pathwise uniqueness for the supercritical Lebesgue--H\"older drifts to explain the present result is sharp.
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