k-Marked Dyson Symbols and Congruences for Moments of Cranks

Abstract

By introducing k-marked Durfee symbols, Andrews found a combinatorial interpretation of 2k-th symmetrized moment η2k(n) of ranks of partitions of n. Recently, Garvan introduced the 2k-th symmetrized moment μ2k(n) of cranks of partitions of n in the study of the higher-order spt-function sptk(n). In this paper, we give a combinatorial interpretation of μ2k(n). We introduce k-marked Dyson symbols based on a representation of ordinary partitions given by Dyson, and we show that μ2k(n) equals the number of (k+1)-marked Dyson symbols of n. We then introduce the full crank of a k-marked Dyson symbol and show that there exist an infinite family of congruences for the full crank function of k-marked Dyson symbols which implies that for fixed prime p≥ 5 and positive integers r and k≤ (p-1)/2, there exist infinitely many non-nested arithmetic progressions An+B such that μ2k(An+B) 0pr.