Strong uniform Wong--Zakai approximations of L\'evy-driven Marcus SDEs
Abstract
For a solution X of a L\'evy-driven d-dimensional Marcus (canonical) stochastic differential equation, we show that the Wong--Zakai type approximation scheme Xh has a strong convergence of order 12: for each T∈ [0,∞) and all x∈ Rd we have E kh≤ T|Xkh(x)-Xhkh(x)|≤ C h12(1+|x|), h 0. We also determine the rate of the locally uniform strong convergence: for each N∈(0,∞) and ∈ (0,1) we have E|x|≤ Nkh≤ T|Xkh(x)-Xhkh(x)|≤ C h1-4d, h 0.
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