English

On a random model of forgetting

Probability 2023-12-18 v2 Combinatorics

Abstract

Georgiou, Katkov and Tsodyks considered the following random process. Let x1,x2,x_1,x_2,\ldots be an infinite sequence of independent, identically distributed, uniform random points in [0,1][0,1]. Starting with S={0}S=\{0\}, the elements xkx_k join SS one by one, in order. When an entering element is larger than the current minimum element of SS, this minimum leaves SS. Let S(1,n)S(1,n) denote the content of SS after the first nn elements xkx_k join. Simulations suggest that the size S(1,n)|S(1,n)| of SS at time nn is typically close to n/en/e. Here we first give a rigorous proof that this is indeed the case, and that in fact the symmetric difference of S(1,n)S(1,n) and the set {xk11/e:1kn}\{x_k\ge 1-1/e: 1 \leq k \leq n \} is of size at most O~(n)\tilde{O}(\sqrt n) with high probability. Our main result is a more accurate description of the process implying, in particular, that as nn tends to infinity n1/2(S(1,n)n/e) n^{-1/2}\big( |S(1,n)|-n/e \big) converges to a normal random variable with variance 3e2e13e^{-2}-e^{-1}. We further show that the dynamics of the symmetric difference of S(1,n)S(1,n) and the set {xk11/e:1kn}\{x_k\ge 1-1/e: 1 \leq k \leq n \} converges with proper scaling to a three dimensional Bessel process.

Keywords

Cite

@article{arxiv.2203.02614,
  title  = {On a random model of forgetting},
  author = {Noga Alon and Dor Elboim and Allan Sly},
  journal= {arXiv preprint arXiv:2203.02614},
  year   = {2023}
}

Comments

24 pages, 4 figures

R2 v1 2026-06-24T10:02:53.127Z