Clique factors in powers of graphs

Abstract

The kth power of a graph G, denoted Gk, has the same vertex set as G, and two vertices are adjacent in Gk if and only if there exists a path between them in G of length at most k. A Kr-factor in a graph is a spanning subgraph in which every component is a complete graph of order r. It is easy to show that for any connected graph G of order divisible by r, G2r-2 contains a Kr-factor. This is best possible as there exist connected graphs G of order divisible by r such that G2r-3 does not contain a Kr-factor. We conjecture that for any 2-connected graph G of order divisible by r, Gr contains a Kr-factor. This was known for r 3 and we prove it for r = 4. We prove a stronger statement that the vertex set of any 2-connected graph G of order 4k can be partitioned into k parts of size 4, such that the four vertices in any part are contained in a subtree of G of order at most 5. More generally, we conjecture that for any partition of n = n1+n2+·s+nk, the vertex set of any 2-connected graph G of order n can be partitioned into k parts V1,V2,…,Vk, such that |Vi| = ni and Vi ⊂eq V(Ti) for some subtree Ti of G of order at most ni+1, for 1 i k.