On principles between 1- and 2-induction, and monotone enumerations

Abstract

We show that many principles of first-order arithmetic, previously only known to lie strictly between 1-induction and 2-induction, are equivalent to the well-foundedness of ωω. Among these principles are the iteration of partial functions (P1) of H\'ajek and Paris, the bounded monotone enumerations principle (non-iterated, BME1) by Chong, Slaman, and Yang, the relativized Paris-Harrington principle for pairs, and the totality of the relativized Ackermann-P\'eter function. With this we show that the well-foundedness of ωω is a far more widespread than usually suspected. Further, we investigate the k-iterated version of the bounded monotone iterations principle (BMEk), and show that it is equivalent to the well-foundedness of the k+1-height ω-tower.