Improved Decomposition Bounds for Partition Polytopes and Odd-Covers

Abstract

The assignments of a set of m items into n clusters of prescribed sizes k1,…,kn can be encoded as the vertices of the partition polytope PP(k1,…,kn). We prove that, if K = \k1,…,kn\, then the combinatorial diameter of PP(k1,…,kn) is at most 3K/2. This improves the previously known upper bound of 2K. A cycle (or path) odd-cover of a graph G is a set of cycles (or paths) with symmetric difference G. We prove that every Eulerian graph G with maximum degree admits a cycle odd-cover and a path odd-cover, each of size at most 3/4. This improves the previously known upper bound of . The two proofs share many similarities and are both based on the proof of Akiyama, Exoo, and Harary that every graph with maximum degree 4 has linear arboricity at most 3.