On the logical structure of choice and bar induction principles

Abstract

We develop an approach to choice principles and their contrapositive bar-induction principles as extensionality schemes connecting an ''intensional'' or ''effective'' view of respectively ill-and well-foundedness properties to an ''extensional'' or ''ideal'' view of these properties. After classifying and analysing the relations between different intensional definitions of ill-foundedness and well-foundedness, we introduce, for a domain A, a codomain B and a ''filter'' T on finite approximations of functions from A to B, a generalised form GDCA,B,T of the axiom of dependent choice and dually a generalised bar induction principle GBIA,B,T such that: - GDCA,B,T intuitionistically captures the strength of the general axiom of choice expressed as ∀ a∃β R(a, b) ⇒∃α∀ a R(α,(a α (a))) when T is a filter that derives point-wise from a relation R on A x B without introducing further constraints, the Boolean Prime Filter Theorem / Ultrafilter Theorem if B is the two-element set B (for a constructive definition of prime filter), the axiom of dependent choice if A = N, Weak K\"onig's Lemma if A = N and B = B (up to weak classical reasoning) - GBIA,B,T intuitionistically captures the strength of G\"odel's completeness theorem in the form validity implies provability for entailment relations if B = B, bar induction when A = N, the Weak Fan Theorem when A = N and B = B. Contrastingly, even though GDCA,B,T and GBIA,B,T smoothly capture several variants of choice and bar induction, some instances are inconsistent, e.g. when A is BN and B is N.