W d-convergence rate of EM schemes for invariant measures of supercritical stable SDEs
Abstract
By establishing the regularity estimates for nonlocal Stein/Poisson equations under γ-order H\"older and dissipative conditions on the coefficients, we derive the W d-convergence rate for the Euler-Maruyama schemes applied to the invariant measure of SDEs driven by multiplicative α-stable noises with α ∈ (12, 2), where W d denotes the Wasserstein metric with d(x,y)=|x-y|γ 1 and γ ∈ ((1-α)+, 1].
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