Fan-complete Ramsey numbers

Abstract

For graphs G and H, we consider Ramsey numbers r(G,H) with tight lower bounds, namely, r(G,H) ≥ ((G)-1)(|H|-1)+1, where (G) denotes the chromatic number of G and |H| denotes the number of vertices in H. We say H is G-good if the equality holds. Let G+H be the join graph obtained from graphs G and H by adding all edges between the disjoint vertex sets of G and H. Let nH denote the union graph of n disjoint copies of H. We show that K1+nH is Kp-good if n is sufficiently large. In particular, the fan-graph Fn=K1 + n K2 is Kp-good if n≥ 27p2, improving previous tower-type lower bounds for n due to Li and Rousseau (1996). Moreover, we give a stronger lower bound inequality for Ramsey number r(G, K1+F) for the case of G=Kp(a1, a2, …, ap), the complete p-partite graph with a1=1 and ai ≤ ai+1. In particular, using a stability-supersaturation lemma by Fox, He and Wigderson (2021), we show that for any fixed graph H, align* r(G,K1+nH) = \ arrayll (p-1)(n |H|+a2-1)+1 & if n|H|+a2-1 is even or a2-1 is even,\\ (p-1)(n |H|+a2-2)+1 & otherwise, array . align* where G=Kp(1,a2, …, ap) with ai's satisfying some mild conditions and n is sufficiently large. The special case of H=K1 gives an answer to Burr's question (1981) about the discrepancy of r(G, K1,n) from G-goodness for sufficiently large n. All bounds of n we obtain are not of tower-types.