On the rate of convergence of strong Euler approximation for SDEs driven by Levy processes
Abstract
SDE driven by an α -stable process, α ∈ 1,2), with Lipshitz continuous coefficient and β -H\"older drift is considered. The existence and uniqueness of a strong solution is proved when β >1-α /2 by showing that it is Lp-limit of Euler approximations. The Lp-error (rate of convergence) is obtained for a nondegenerate truncated and nontruncated driving process. The rate in the case of Lipshitz continuous coefficients is derived as well.
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