On bounded arithmetic augmented by the ability to count certain sets of primes

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Journal of Symbolic Logic 74 (2):455-473 (2009)
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Abstract

Over 25 years ago, the first author conjectured in [15] that the existence of arbitrarily large primes is provable from the axioms I Δ₀(π) + def(π), where π(x) is the number of primes not exceeding x, IΔ₀(π) denotes the theory of Δ₀ induction for the language of arithmetic including the new function symbol π, and de f(π) is an axiom expressing the usual recursive definition of π. We prove a modified version in which π is replaced by a more general function ξ that counts some of the primes below x (which primes depends on the values of parameters in ξ), and has the property that π is provably Δ₀(ξ) definable

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10.2178/jsl/1243948322

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Some Classes of Recursive Functions.Andrzej Grzegorczyk - 1955 - Journal of Symbolic Logic 20 (1):71-72.
On Grzegorczyk induction.Ch Cornaros - 1995 - Annals of Pure and Applied Logic 74 (1):1-21.

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