An improved double-exponential lower bound for r4(5,n)

Abstract

The Ramsey number rk(s,n) is the smallest integer N such that every N-vertex k-graph contains either a copy of Ks(k) or an independent set of size n. A well-known conjecture of Erdos and Hajnal states that for any fixed 4 k<s, rk(s,n) twrk-1((n)). At present, only the last two cases of this conjecture remain open, namely r4(5,n)22(n) and r4(6,n)22(n). Recently, Du, Hu, Liu, and Wang achieved a breakthrough by proving r4(5,n) 22(n1/7), which is the first double-exponential lower bound for r4(5,n). In this note, we improve this to 22(n1/5) by modifying their construction and reducing the greedy selection of local maxima from seven layers to five, thereby making further progress towards the Erdos-Hajnal conjecture.