| Abstract: | For graphs G and H, let  denote the property that for every proper edge‐coloring of G (with an arbitrary number of colors) there is a rainbow copy of H in G, that is, a copy of H with no two edges of the same color. The authors (2014) proved that, for every graph H, the threshold function  of this property for the binomial random graph  is asymptotically at most  , where  denotes the so‐called maximum 2‐density of H. Nenadov et al. (2014) proved that if H is a cycle with at least seven vertices or a complete graph with at least 19 vertices, then  . We show that there exists a fairly rich, infinite family of graphs F containing a triangle such that if  for suitable constants  and  , where  , then  almost surely. In particular,  for any such graph F. |
