Article ID Journal Published Year Pages File Type
4647565 Discrete Mathematics 2013 8 Pages PDF
Abstract
Let N be the set of positive integers, and let P(n)=⋃1≤l≤n{(x1,…,xl)∈Nl:x1+⋯+xl=n} be the set of (ordered) partitions of n. We show that there exist a rank function and orderings ≤c and ≺ such that the ranked poset (P(n),≤c,≺) is Macaulay.
Keywords
Related Topics
Physical Sciences and Engineering Mathematics Discrete Mathematics and Combinatorics
Preview
A Kruskal-Katona type theorem for integer partitions
Authors
, ,