Elephant random walk with attributed steps and extractions of random sizes

Abstract

We study a model of market economics wherein the (n+1)-st customer, for each n≥slant N, with N being a prespecified positive integer, draws a sample of (random) size Kn, either with replacement or without, from the customers of the past. Each sampled customer is queried as to which of the two products, A and B, available in the oligopolistic market, they chose, and whether they are satisfied or not with their choice. The (n+1)-st customer now employs a stochastic rule, based on the information collected from the sampled customers, to decide which of the two products to buy. The probability that a customer is satisfied with the product they have purchased equals q1 when the product is A, and q2 when it is B, independent of all else. The resulting stochastic process may be represented as a variant of the celebrated elephant random walk, with the relative performance (in terms of sale) of A with respect to B, up to and including the n-th sale, captured by the position Sn of the walker at time n. We study the almost sure convergence of Sn/n, as well as the convergence in distribution of suitably scaled versions of Sn (where the scaling depends on the regime we are in).