New Tower-Type Lower Bounds for Hypergraph Ramsey Numbers

Abstract

The Ramsey number rk(s,m) is the smallest N such that any red/blue coloring of the k-subsets of [N] contains a red s-set or a blue m-set. For fixed k and s, and for sufficiently large m, the tower growth rate is determined by the stepping-up lemma, but for s=m=k+1 the available stepping-up lemmas do not apply. Fox asked for estimates of rk(k+1,k+1). Pudlák, Rödl, and Wesley gave the first tower-type bound: rk(k+1,k+1) s3( k/4) 4twr k/4-4(2), where s3(k) is the 3-color shift number and twr1(2)=2, twri+1(2)=2twri(2). In this paper, for k 6, we improve the lower bound to rk(k+1,k+1)> s3( k/2-2) by overcoming an obstruction in their construction. In addition, we give an exact characterization of s3(k) and, for k 5, obtain a new explicit lower bound s3(k)(twrk-2(2))2, which improves the result of Pudlák and Rödl. Consequently, for k 14, rk(k+1,k+1)>(twr k/2-4(2))2.