On the Positive Moments of Ranks of Partitions

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 in terms of (k+1)-marked Durfee symbols of n. In this paper, we consider the k-th symmetrized positive moment ηk(n) of ranks of partitions of n which is defined as the truncated sum over positive ranks of partitions of n. As combintorial interpretations of η2k(n) and η2k-1(n), we show that for fixed k and i with 1≤ i≤ k+1, η2k-1(n) equals the number of (k+1)-marked Durfee symbols of n with the i-th rank being zero and η2k(n) equals the number of (k+1)-marked Durfee symbols of n with the i-th rank being positive. The interpretations of η2k-1(n) and η2k(n) also imply the interpretation of η2k(n) given by Andrews since η2k(n) equals η2k-1(n) plus twice of η2k(n). Moreover, we obtain the generating functions of η2k(n) and η2k-1(n).