Strong convergence of the Euler scheme for singular kinetic SDEs driven by α-stable processes
Abstract
We study the strong approximation of the solutions to singular stochastic kinetic equations (also referred to as second-order SDEs) driven by α-stable processes, using an Euler-type scheme inspired by [11]. For these equations, the stability index α lies in the range (1,2), and the drift term exhibits anisotropic β-H\"older continuity with β >1 - α2. We establish a convergence rate of (12 + βα(1+α) 12), which aligns with the results in [4] concerning first-order SDEs.
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