Threshold functions for distinct parts: revisiting Erdos-Lehner

Abstract

We study four problems: put n distinguishable/non-distinguishable balls into k non-empty distinguishable/non-distinguishable boxes randomly. What is the threshold function k=k(n) to make almost sure that no two boxes contain the same number of balls? The non-distinguishable ball problems are very close to the Erd os--Lehner asymptotic formula for the number of partitions of the integer n into k parts with k=o(n1/3). The problem is motivated by the statistics of an experiment, where we only can tell whether outcomes are identical or different.