Ramsey numbers of graphs with most degrees bounded in random graphs

Abstract

For graphs F and G, let F G signify that any red/blue edge coloring of F contains a monochromatic G. Denote by G(N,p) the random graph space of order N and edge probability p. Using the regularity method, one can show that for any fixed p∈ (0,1], almost all graphs F∈ G(cn,p) have F G for any graph G of order n and all but at most m degrees bounded, where c is an integer depending on p and m. Note that r(Km,n) 2m n and r(Km+Kn) 2m n as n∞, for which we investigate the relation between c and p. Let N= c\,2m n with c>1 and pu,p=1c1/m(1 M nn\,), where M=M(c,m)>0. It is shown that pu and p are Ramsey thresholds of Km,n in G(N,p). Namely, almost all F∈ G(N,pu) and almost no F∈ G(N,p) have F Km,n, respectively. Moreover, it is shown that pu and p are (ordinary) upper threshold and lower threshold of Km+Kn to appear in G(N,p/2), respectively. We show that G(N,p/2) can be identified as the set of red (or blue) graphs obtained from F∈ G(N,p) by red/blue edge coloring of F with probability 1/2 for each color, which leads to the definition of the weak Ramsey thresholds.