Fan-goodness of sparse graphs

Abstract

Let G be a connected graph of order n, Fk be a fan consisting of k triangles sharing a common vertex, and tFk be t vertex-disjoint copies of Fk. Brennan (2017) showed the Ramsey number r(G,Fk)=2n-1 for G being a unicyclic graph for n ≥ k2-k+1 and k 18, and asked the threshold c(n) for which r(G,Fk) ≥ 2n holds for any G containing at least c(n) cycles and n being large. In this paper, we consider fan-goodness of general sparse graphs and show that if G has at most n(1+ε(k)) edges, where ε(k) is a constant depending on k, then r(G,Fk)=2n-1 for n 36k4, which implies that c(n) is greater than ε(k) n. Moreover, if G has at most n(1+ε(k,t)) edges, where ε(k,t) is a constant depending on k,t, then r(G,tFk)=2n+t-2 provided n 161t2k4.