A lower bound on the Ramsey number Rk(k+1,k+1)
Abstract
We will prove that Rk(k+1,k+1)≥ 4 tw k/4 -3(2), where tw is the tower function defined by tw1(x)=x and twi+1(x)=2twi(x). We also give proofs of Rk(k+1,k+2)≥ 4 twk-7(2), Rk(k+1,2k+1)≥ 4 twk-3(2), and Rk(k+2,k+2)≥ 4 twk-4(2).
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