Counting Connected Set Partitions of Graphs

Abstract

Let G=(V,E) be a simple undirected graph with n vertices then a set partition π=\V1, ..., Vk\ of the vertex set of G is a connected set partition if each subgraph G[Vj] induced by the blocks Vj of π is connected for 1 j k. Define qi(G) as the number of connected set partitions in G with i blocks. The partition polynomial is then Q(G, x)=Σi=0n qi(G)xi. This paper presents a splitting approach to the partition polynomial on a separating vertex set X in G and summarizes some properties of the bond lattice. Furthermore the bivariate partition polynomial Q(G,x,y)=Σi=1n Σj=1m qij(G)xiyj is briefly discussed, where qij(G) counts the number of connected set partitions with i blocks and j intra block edges. Finally the complexity for the bivariate partition polynomial is proven to be P-hard.