Decompositions of Complete Multipartite Graphs into Complete Graphs

Abstract

Let k≥≥1 and n≥ 1 be integers. Let G(k,n) be the complete k-partite graph with n vertices in each colour class. An -decomposition of G(k,n) is a set X of copies of Kk in G(k,n) such that each copy of K in G(k,n) is a subgraph of exactly one copy of Kk in X. This paper asks: when does G(k,n) have an -decomposition? The answer is well known for the =2 case. In particular, G(k,n) has a 2-decomposition if and only if there exists k-2 mutually orthogonal Latin squares of order n. For general , we prove that G(k,n) has an -decomposition if and only if there are k- Latin cubes of dimension and order n, with an additional property that we call mutually invertible. This property is stronger than being mutually orthogonal. An -decomposition of G(k,n) is then constructed whenever no prime less than k divides n.