Two-colored generalized Frobenius partitions and minimal-excludant sums over bipartitions

Abstract

Let 2,a(n) denote the number of (2,a)-colored Frobenius partitions of weight n, where the two rows have prescribed length difference. We study the two cases a=0 and a=1 and connect them with minimal-excludant statistics on bipartitions. Let σ2(n) be the sum of the Lin--Liu bipartition minimal excludants over all bipartitions of n, and let E2(n) be the number of bipartitions whose two component minimal excludants are equal. For all n≥ 0, we give a combinatorial proof of \[ 2,0(n)=2σ2(n) 2,1(n)=2σ2(n)-E2(n). \] These identities give direct combinatorial interpretations of two-colored Frobenius partition functions in terms of bipartition minimal-excludant sums.