Weak Error on the densities for the Euler scheme of stable additive SDEs with Besov drift
Abstract
We are interested in the Euler-Maruyama dicretization of the formal SDE, dXt=b(t,Xt)dt+dZt, where Z is a symmetric isotropic d dimensional stable process of index α∈ (1,2), and b is distributional. It belongs to a mix Lebesgue-Besov space. The associated parameters satisfy some constraints which guarantee weak-well posedness. Defining an appropriate Euler scheme, we obtain a convergence rate for the weak error on the densities. The rate depends on the parameters.
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