A law of the iterated logarithm for small counts in Karlin's occupancy scheme

Abstract

In the Karlin infinite occupancy scheme, balls are thrown independently into an infinite array of boxes 1, 2,…, with probability pk of hitting the box k. For j,n∈N, denote by K*j(n) the number of boxes containing exactly j balls provided that n balls have been thrown. We call small counts the variables K*j(n), with j fixed. Our main result is a law of the iterated logarithm (LIL) for the small counts as the number of balls thrown becomes large. Its proof exploits a Poissonization technique and is based on a new LIL for infinite sums of independent indicators Σk≥ 11Ak(t) as t∞, where the family of events (Ak(t))t≥ 0 is not necessarily monotone in t. The latter LIL is an extension of a LIL obtained recently by Buraczewski, Iksanov and Kotelnikova (2023+) in the situation that (Ak(t))t≥ 0 forms a nondecreasing family of events.

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