A note on Erd\"os-Faber-Lov\'asz Conjecture and edge coloring of complete graphs

Abstract

A linear hypergraph is intersecting if any two different edges have exactly one common vertex and an n-quasicluster is an intersecting linear hypergraph with n edges each one containing at most n vertices and every vertex is contained in at least two edges. The Erd\"os-Faber-Lov\'asz Conjecture states that the chromatic number of any n-quasicluster is at most n. In the present note we prove the correctness of the conjecture for a new infinite class of n-quasiclusters using a specific edge coloring of the complete graph.