Let I¦− 2 denote the fragment of Peano Arithmetic obtained by restricting the induction scheme to parameter free ¦2 formulas. Answering a question of R. Kaye, L. Beklemishev showed that the provably total computable functions of I¦− 2 are, precisely, the primitive recursive ones. In this work we give a new proof of this fact through an analysis of certain local variants of induction principles closely related to I¦− 2 . In this way, we obtain a more direct answer to Kaye’s question, avoiding the metamathematical machinery (reflection principles, provability logic,...) needed for Beklemishev’s original proof. Our methods are model–theoretic and allow for a general study of I¦− n+1 for all n ¸ 0. In particular, we derive a new co...
AbstractThere is a very simple way in which the safe/normal variable discipline of Bellantoni–Cook r...
We characterize the sets of all Π2 and all $\mathcal {B}(\Sigma _{1})$equation image (= Boolean comb...
Recursive maps, nowadays called primitive recursive maps, PR maps, have been introduced by Gödel in ...
AbstractWe study the classes of computable functions that can be proved to be total by means of para...
This paper investigates the status of the fragments of Peano Arithmetic obtained by restricting indu...
A natural example of a function algebra is R (T), the class of provably total computable functions...
AbstractA well-known result (Leivant, 1983) states that, over basic Kalmar elementary arithmetic EA,...
Japaridze's provability logic $GLP$ has one modality $[n]$ for each natural number and has been used...
Kreisel's conjecture is the statement: if, for all n ∈ ℕ, PA ⊢ksteps φ(n), then PA ⊢ ∀x.φ(x). For a ...
The arithmetical theory EA(I;O) developed by Çagman, Ostrin and Wainer ([18] and [48]) provides a fo...
summary:The set of all indices of all functions provably recursive in any reasonable theory $T$ is s...
By a theorem of R. Kaye, J. Paris and C. Dimitracopoulos, the class of the ¦n+1–sentences true in t...
This paper presents a new proof of the characterization of the provably recursive functions of the f...
We study the fragment of Peano arithmetic formalizing the induction principle for the class of deci...
We study the arithmetical schema asserting that every eventually decreasing primitive recursive fun...
AbstractThere is a very simple way in which the safe/normal variable discipline of Bellantoni–Cook r...
We characterize the sets of all Π2 and all $\mathcal {B}(\Sigma _{1})$equation image (= Boolean comb...
Recursive maps, nowadays called primitive recursive maps, PR maps, have been introduced by Gödel in ...
AbstractWe study the classes of computable functions that can be proved to be total by means of para...
This paper investigates the status of the fragments of Peano Arithmetic obtained by restricting indu...
A natural example of a function algebra is R (T), the class of provably total computable functions...
AbstractA well-known result (Leivant, 1983) states that, over basic Kalmar elementary arithmetic EA,...
Japaridze's provability logic $GLP$ has one modality $[n]$ for each natural number and has been used...
Kreisel's conjecture is the statement: if, for all n ∈ ℕ, PA ⊢ksteps φ(n), then PA ⊢ ∀x.φ(x). For a ...
The arithmetical theory EA(I;O) developed by Çagman, Ostrin and Wainer ([18] and [48]) provides a fo...
summary:The set of all indices of all functions provably recursive in any reasonable theory $T$ is s...
By a theorem of R. Kaye, J. Paris and C. Dimitracopoulos, the class of the ¦n+1–sentences true in t...
This paper presents a new proof of the characterization of the provably recursive functions of the f...
We study the fragment of Peano arithmetic formalizing the induction principle for the class of deci...
We study the arithmetical schema asserting that every eventually decreasing primitive recursive fun...
AbstractThere is a very simple way in which the safe/normal variable discipline of Bellantoni–Cook r...
We characterize the sets of all Π2 and all $\mathcal {B}(\Sigma _{1})$equation image (= Boolean comb...
Recursive maps, nowadays called primitive recursive maps, PR maps, have been introduced by Gödel in ...