The Ouroboros Goodstein Principle
Abstract
In arXiv:2508.14768, a variant of Goodstein's original process was recently introduced which, given a set B⊂eq N of bases, writes each n∈N in B-normal form, namely n=bea+r, where b∈ B the greatest base below n. The numbers e and r are then recursively written in B-normal form, and finally each base of B is replaced by a corresponding base of some other set C⊂eq N. The resulting process was shown to terminate and to be independent of KP, but the proofs relied on two different ordinal assignments: one monotone but not tight enough to establish independence, and another suitable for independence but not monotone and thus ineffective for proving termination. We introduce a new ordinal assignment that simultaneously yields termination and independence, thereby revealing the `true' ordinals associated with the numbers in the process. This assignment allows us to investigate which restrictions to impose on the process in order for the proof-theoretic strength of its termination to lie between the systems RCA0, ACA0, ATR0 and KP.
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