On Asymptotics of Solutions of Stochastic Differential Equations with Jumps
Abstract
Consider a one-dimensional stochastic differential equation with jumps d X(t) = a(X(t)) d t + Σk = 1m bk(X(t-)) d Zk(t), where Zk, \ k ∈ \1, 2, ..., m\ are independent centered L\'evy processes with finite second moments. We prove that if coefficient a(x) has certain power asymptotics as x ∞ and coefficients bk, \ k ∈ \1, 2, ..., m\, satisfy certain growth condition then a solution X(t) has the same asymptotics as a solution of d x(t) = a(x(t)) d t as t ∞ a.s.
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