Finite Combinatorics and Fragments of Arithmetic
Abstract
In fragments of first order arithmetic, definable maps on finite domains could behave very differently from finite maps. Here combinatorial properties of n+1-definable maps on finite domains are compared in the absence of Bn+1. It is shown that GPHP(n+1) (the n+1-instance of Kaye's General Pigeonhole Principle) lies strictly between CARD(n+1) and WPHP(n+1) (Weak Pigeonhole Principle for n+1-maps), and also that FRT(n+1) (Finite Ramsey's Theorem for n+1-maps) does not imply WPHP(n+1).
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