Elephant random walks with multiple extractions and general reinforcement functions

Abstract

We consider a generalized model of elephant random walks wherein the walker, during the (n+1)-st time-stamp, draws from the past (i.e. the set \1,2,…,n\) a sample of k time-stamps, either with replacement or without, where k may either remain fixed as n grows, or k=k(n) may grow with n. Letting \Un,1, Un,2, …, Un,k\ denote the time-stamps sampled, the step taken by the walker during the (n+1)-st time-stamp, denoted Xn+1, is a 1-valued random variable whose distribution depends on the proportion of (+1)-valued steps out of XUn,1,XUn,2,…,XUn,k via a reinforcement function f. In this paper, we investigate the asymptotic behaviour, i.e. strong and weak convergence, of this random walk model under suitable assumptions made on the function f (as well as on the sequence \k(n)\ when the sample size varies with n).