Fractional clique decompositions of dense balanced multipartite graphs

Abstract

This paper concerns fractional Ks-decompositions of multipartite graphs. For integers r s 3, we consider balanced r-partite graphs G on rn vertices. We establish necessary conditions for G to admit a fractional Ks-decomposition, extending the notion of s-admissibility from the case r=s to r>s. Using an association scheme on the edge set of a complete r-partite graph, we prove that if r s+2 and the partite minimum degree of G is at least (1-c)n with c 1/((s-2)(s+1)(s-1)4), then G has a fractional Ks-decomposition. For r=s+1, we show that under the condition c 1/(3s3(s-2)2), every s-admissible balanced (s+1)-partite graph with partite minimum degree at least (1-c)n admits a fractional Ks-decomposition. These results provide new degree thresholds for fractional Ks-decompositions of multipartite graphs with more than s parts.