A symmetric chain decomposition of N(m,n) of composition

Abstract

A poset is called a symmetric chain decomposition if the poset can be expressed as a disjoint union of symmetric chains. For positive integers m and n, let N(m,n) denote the set of all compositions α=(α1,·s,αm), with 0 αi n for each i=1,·s,m. Define order < as follow, ∀ α,β ∈ N(m,n), β < α if and only if βi αi(i=1,·s,m) and Σi=1mβi <Σi=1mαi. In this paper, we show that the poset (N(m,n),<) can be expressed as a disjoint of symmetric chains by constructive method.