Average Size of a Self-conjugate (s, t)-Core Partition

Abstract

Armstrong, Hanusa and Jones conjectured that if s,t are coprime integers, then the average size of an (s,t)-core partition and the average size of a self-conjugate (s,t)-core partition are both equal to (s+t+1)(s-1)(t-1)24. Stanley and Zanello showed that the average size of an (s,s+1)-core partition equals s+13/2. Based on a bijection of Ford, Mai and Sze between self-conjugate (s,t)-core partitions and lattice paths in s2 × t2 rectangle, we obtain the average size of a self-conjugate (s,t)-core partition as conjectured by Armstrong, Hanusa and Jones.