Author:
FUJIWARA MAKOTO,KURAHASHI TAISHI
Abstract
AbstractAkama et al. [1] systematically studied an arithmetical hierarchy of the law of excluded middle and related principles in the context of first-order arithmetic. In that paper, they first provide a prenex normal form theorem as a justification of their semi-classical principles restricted to prenex formulas. However, there are some errors in their proof. In this paper, we provide a simple counterexample of their prenex normal form theorem [1, Theorem 2.7], then modify it in an appropriate way which still serves to largely justify the arithmetical hierarchy. In addition, we characterize a variety of prenex normal form theorems by logical principles in the arithmetical hierarchy. The characterization results reveal that our prenex normal form theorems are optimal. For the characterization results, we establish a new conservation theorem on semi-classical arithmetic. The theorem generalizes a well-known fact that classical arithmetic is
$\Pi _2$
-conservative over intuitionistic arithmetic.
Publisher
Cambridge University Press (CUP)
Cited by
6 articles.
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1. Prenex normalization and the hierarchical classification of formulas;Archive for Mathematical Logic;2023-12-23
2. On the decomposition of WKL!!;Philosophical Transactions of the Royal Society A: Mathematical, Physical and Engineering Sciences;2023-04-10
3. Refining the arithmetical hierarchy of classical principles;Mathematical Logic Quarterly;2022-06-09
4. $$\Delta ^0_1$$ variants of the law of excluded middle and related principles;Archive for Mathematical Logic;2022-04-29
5. CONSERVATION THEOREMS ON SEMI-CLASSICAL ARITHMETIC;The Journal of Symbolic Logic;2022-03-17