Factorizing the Rado graph and infinite complete graphs

Abstract

Let F=\Fα: α∈ A\ be a family of infinite graphs, together with . The Factorization Problem FP(F, ) asks whether F can be realized as a factorization of , namely, whether there is a factorization G=\α: α∈ A\ of such that each α is a copy of Fα. We study this problem when is either the Rado graph R or the complete graph K of infinite order . When F is a countable family, we show that FP(F, R) is solvable if and only if each graph in F has no finite dominating set. We also prove that FP(F, K) admits a solution whenever the cardinality F coincide with the order and the domination numbers of its graphs. For countable complete graphs, we show some non existence results when the domination numbers of the graphs in F are finite. More precisely, we show that there is no factorization of KN into copies of a k-star (that is, the vertex disjoint union of k countable stars) when k=1,2, whereas it exists when k≥ 4, leaving the problem open for k=3. Finally, we determine sufficient conditions for the graphs of a decomposition to be arranged into resolution classes.