Asymptotic Formula for (t+1)-Regular Partitions
Abstract
A partition is t-regular if none of its parts is divisible by t. Let p(N,t) be the number of (t+1)-regular partitions of a positive integer N. In 1971, Hagis proved an asymptotic formula for p(N,t) using the circle method, when t fixed. In this article, we use the saddle point method and extend the result of Hagis in different ranges of t, obtaining explicit bounds. We also discuss an application of our result to estimate zeros in the character table of the symmetric group.
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