A note on rainbow saturation number of paths

Abstract

For a fixed graph F and an integer t, the rainbow saturation number of F, denoted by satt(n,R(F)), is defined as the minimum number of edges in a t-edge-colored graph on n vertices which does not contain a rainbow copy of F, i.e., a copy of F all of whose edges receive a different color, but the addition of any missing edge in any color from [t] creates such a rainbow copy. Barrus, Ferrara, Vardenbussche and Wenger prove that satt(n,R(P)) n-1 for 4 and satt(n,R(P)) n-1 · -12 for t -12, where P is a path with edges. In this short note, we improve the upper bounds and show that satt(n,R(P)) n · (-2 2+4) for 5 and t 2-5.