Asymptotics for t-Core Partitions and Stanton's Conjecture

Abstract

A partition is a t-core partition if t is not one of its hook lengths. Let ct(N) be the number of t-core partitions of N. In 1999, Stanton conjectured ct(N) ct+1(N) if 4 t N-1. This was proved for t fixed and N sufficiently large by Anderson, and for small values of t by Kim and Rouse. In this paper, we prove Stanton's conjecture in general. Our approach is to find a saddle point asymptotic formula for ct(N), valid in all ranges of t and N. This includes the known asymptotic formulas for ct(N) as special cases, and shows that the behavior of ct(N) depends on how t2 compares in size to N. For example, our formula implies that if t2 = N + o(t), then ct(N) = (2πA N)B N (1 + o(1)) for suitable constants A and B defined in terms of .