More on Rainbow Cliques in Edge-Colored Graphs

Abstract

In an edge-colored graph G, a rainbow clique Kk is a k-complete subgraph in which all the edges have distinct colors. Let e(G) and c(G) be the number of edges and colors in G, respectively. In this paper, we show that for any >0, if e(G)+c(G) ≥ (1+k-3k-2+2) n 2 and k≥ 3, then for sufficiently large n, the number of rainbow cliques Kk in G is (nk). We also characterize the extremal graphs G without a rainbow clique Kk, for k=4,5, when e(G)+c(G) is maximum. Our results not only address existing questions but also complete the findings of Ehard and Mohr (Ehard and Mohr, Rainbow triangles and cliques in edge-colored graphs. European Journal of Combinatorics, 84:103037,2020).