A connection between extreme value theory and long time approximation of SDE's

Abstract

We consider a sequence (n)n1 of i.i.d. random values living in the domain of attraction of an extreme value distribution. For such sequence, there exists (an) and (bn), with an>0 and bn∈ for every n 1, such that the sequence (Xn) defined by Xn=((1,...,n)-bn)/an converges in distribution to a non degenerated distribution. In this paper, we show that (Xn) can be viewed as an Euler scheme with decreasing step of an ergodic Markov process solution to a SDE with jumps and we derive a functional limit theorem for the sequence (Xn) from some methods used in the long time numerical approximation of ergodic SDE's.