Euler--Maruyama scheme for α-stable SDE with distributional drift
Abstract
In this paper, we consider a class of stochastic differential equations driven by symmetric non-degenerate α-stable processes (including cylindrical ones) with α ∈ (1,2). We first establish a quantitative estimate for the Euler scheme under bounded drift b(x), with an explicit dependence on \| b \|L∞. Then we obtain the weak convergence rates for the case where the drift coefficient belongs to a Besov space of negative order.
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