The Threshold for Ackermannian Ramsey numbers

Abstract

For a function g: , the g-regressive Ramsey number of k is the least N so that \[N (k)g\] . This symbol means: for every c:[N]2 that satisfies c(m,n) g(\m,n\) there is a min-homogeneous H N of size k, that is, the color c(m,n) of a pair \m,n\ H depends only on \m,n\. It is known (km,ks) that -regressive Ramsey numbers grow in k as fast as (k), Ackermann's function in k. On the other hand, for constant g, the g-regressive Ramsey numbers grow exponentially in k, and are therefore primitive recursive in k. We compute below the threshold in which g-regressive Ramsey numbers cease to be primitive recursive and become Ackermannian, by proving: Suppose g: is weakly increasing. Then the g-regressive Ramsey numbers are primitive recursive if an only if for every t>0 there is some Mt so that for all n Mt it holds that g(m)<n1/t and Mt is bounded by a primitive recursive function in t.

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