Abstract
Let ℐ be the system of analysis studied in [13]. ℐ’s language is two-sorted — with number variables x, y, z, … and choice-sequence variables α, β, γ, … — and has a constant for zero, symbols for certain primitive-recursive functions, an identity predicate in the number sort, and notation for γ-abstraction. Starting from two-sorted intuitionistic logic, ℐ adds axioms for Heyting arithmetic (HA), recursion equations for the primitive-recursive functions, certain “postulates concerning functions” [7, p. 14], and four axiom schemata described below: relativized dependent choice (RDC), monotone bar induction (BI M), weak continuity for numbers (WC-N), and Kripke’s schema (KS).
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For Anil Nerode, with appreciation
The research reported here was supported by NSF grant DMS-9007990.
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Scowcroft, P. (1993). The Disjunction and Numerical Existence Properties for Intuitionistic Analysis. In: Crossley, J.N., Remmel, J.B., Shore, R.A., Sweedler, M.E. (eds) Logical Methods. Progress in Computer Science and Applied Logic, vol 12. Birkhäuser, Boston, MA. https://doi.org/10.1007/978-1-4612-0325-4_25
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DOI: https://doi.org/10.1007/978-1-4612-0325-4_25
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