Combinatorial Proof of the Minimal Excludant Theorem

Abstract

The minimal excludant of a partition λ, mex(λ), is the smallest positive integer that is not a part of λ. For a positive integer n, σ\, mex(n) denotes the sum of the minimal excludants of all partitions of n. Recently, Andrews and Newman obtained a new combinatorial interpretations for σ\, mex(n). They showed, using generating functions, that σ\, mex(n) equals the number of partitions of n into distinct parts using two colors. In this paper, we provide a purely combinatorial proof of this result and new properties of the function σ\, mex(n). We generalize this combinatorial interpretation to σr\, mex(n), the sum of least r-gaps in all partitions of n. The least r-gap of a partition λ is the smallest positive integer that does not appear at least r times as a part of λ.