Generalized selection problem with L\'evy noise

Abstract

Let A>0, β∈(0,1), and let Z(α) be a strictly α-stable L\'evy process with the jump measure (d z)=(C+I(0,∞)(z)+ C-I(-∞,0)(z))|z|-1-α\,d z, α∈ (1,2), C≥ 0, C++C->0. The selection problem for the model stochastic differential equation d X=(A+I[0,∞)( X) - A-I(-∞,0)( X))| X|β \,d t + d Z(α) states that in the small noise limit 0, solutions X converge weakly to the maximal or minimal solutions of the limiting non-Lipschitzian ordinary differential equation d x=(A+I[0,∞)( x)- A-I(∞,0)( x))| x|β \,d t with probabilities p= p(α,C+/C-,β, A+/A-), see [Pilipenko and Proske, Stat. Probab. Lett., 132:62-73, 2018]. In this paper we solve the generalized selection problem for the stochastic differential equation d X=a(X)\,d t+ b(X)\,d Z whose dynamics in the vicinity of the origin in certain sense reminds of dynamics of the model equation. In particular we show that solutions X also converge to the maximal or minimal solutions of the limiting irregular ordinary differential equation d x=a(x) \,d t with the same model selection probabilities p. This means that for a large class of irregular stochastic differential equations, the selection dynamics is completely determined by four local parameters of the drift and the jump measure.