The arithmetical theory EA(I;O) developed by Çagman, Ostrin and Wainer ([18] and [48]) provides a formal setting for the variable separation of Bellantoni-Cook predicative recursion [6]. As such, EA(I;O) separates variables into outputs, which are quantified over, and inputs, for which induction applies. Inputs remain free throughout giving inductions in EA(I;O) a pointwise character termed predicative induction. The result of this restriction is that the provably recursive functions are the elementary functions. An infinitary analysis brings out a connection to the Slow-Growing Hierarchy yielding є0 as the appropriate proof-theoretic ordinal in a pointwise sense. Chapters 1 and 2 are devoted to an exposition of these results. In Chapter 3 ...
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...
AbstractWe present a Parametrization Theorem for (positive elementary) inductions that use a bounded...
The arithmetical theory EA(I;O) developed by Çagman, Ostrin and Wainer ([18] and [48]) provides a fo...
AbstractThere is a very simple way in which the safe/normal variable discipline of Bellantoni–Cook r...
Gödel Theorems revisited. Categorical free-variables theory of Primitive Recursion and of mu-recursi...
Induction is the process by which we reason from the particular to the general. In this paper we use...
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,...
Recursive maps, nowadays called primitive recursive maps, PR maps, have been introduced by Gödel in ...
Proofs in an arithmetic system are ranked according to a ramification hierarchy based on occurrences...
We study the arithmetical schema asserting that every eventually decreasing primitive recursive fun...
Let I¦− 2 denote the fragment of Peano Arithmetic obtained by restricting the induction scheme to ...
AbstractWe define a class of functions, the descent recursive functions, relative to an arbitrary el...
Recursive maps, nowadays called primitive recursive maps, p. r. maps, have been introduced by Gödel ...
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...
AbstractWe present a Parametrization Theorem for (positive elementary) inductions that use a bounded...
The arithmetical theory EA(I;O) developed by Çagman, Ostrin and Wainer ([18] and [48]) provides a fo...
AbstractThere is a very simple way in which the safe/normal variable discipline of Bellantoni–Cook r...
Gödel Theorems revisited. Categorical free-variables theory of Primitive Recursion and of mu-recursi...
Induction is the process by which we reason from the particular to the general. In this paper we use...
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,...
Recursive maps, nowadays called primitive recursive maps, PR maps, have been introduced by Gödel in ...
Proofs in an arithmetic system are ranked according to a ramification hierarchy based on occurrences...
We study the arithmetical schema asserting that every eventually decreasing primitive recursive fun...
Let I¦− 2 denote the fragment of Peano Arithmetic obtained by restricting the induction scheme to ...
AbstractWe define a class of functions, the descent recursive functions, relative to an arbitrary el...
Recursive maps, nowadays called primitive recursive maps, p. r. maps, have been introduced by Gödel ...
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...
AbstractWe present a Parametrization Theorem for (positive elementary) inductions that use a bounded...