Axiom Beta Implies Elementary Transfinite Recursion

Abstract

We show that C, a weak theory of sets with Axiom Beta, proves the scheme of Elementary, or Δ0 Transfinite Recursion and can generate, for every set, the corresponding relativized constructible hierarchy. We show that the theory C corresponds to Simpson's system ATR0set without the Axiom of Countability. In fact, C proves the totality of the Veblen function and of all primitive recursive set functions. In particular, this means our system C is equivalent to PRSω+Axiom Beta. We also establish an upper bound, though not a sharp one, for the Σ1-definable functions of C. Finally, we show that the variant of C in which the Finite Powerset Axiom is replaced by the closure under the rudimentary functions is a strictly weaker theory and no longer ensures the existence of the relativized constructible hierarchy.

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