The cohesive and stable Ramsey theorems and proof size over a weak base theory

Abstract

We show that over the weak base theory RCA0*, cohesive Ramsey's theorem for pairs CRT22 implies exponential closure of the definable cut I01, which is the intersection of all 01-definable cuts. Consequences include non-elementary proof speedup of RCA0* + CRT22 over RCA0* for 1 sentences and the unprovability of CRT22 in RCA0* + CAC. On the other hand, we show that RCA0* + SRT22, where SRT22 is stable Ramsey's theorem for pairs, is polynomially simulated by RCA0* with respect to proofs of ∀ 03 sentences. Nevertheless, SRT22 also implies a nontrivial property of I01, specifically closure under functions of quasipolynomial growth rate.