The asymptotics of r(4,t)
Abstract
For integers s,t ≥ 2, the Ramsey numbers r(s,t) denote the minimum N such that every N-vertex graph contains either a clique of order s or an independent set of order t. In this paper we prove \[ r(4,t) = (t34 \! t) as t → ∞\] which determines r(4,t) up to a factor of order 2 \! t, and solves a conjecture of Erdos.
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