Partitions with prescribed sum of reciprocals: computational results

Abstract

For a positive rational α, call a set of distinct positive integers \a1, a2, …, ar\ an α-partition of n, if the sum of the ai is equal to n and the sum of the reciprocals of the ai is equal to α. Define nα to be the smallest positive integer such that for all n nα an α-partition of n exists and, for a positive integer M 2, define NM to be the smallest positive integer such that for all n NM a 1-partition of n exists where M does not divide any of the ai. In this paper we determine NM for all M 2, and find the set of all α such that nα 100.

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