This paper investigates analogs of the Kreisel-Lacombe-Shoenfield Theorem in the context of the type-2 basic feasible functionals. We develop a direct, polynomial-time analog of effective operation in which the time bounding on computations is modeled after Kapron and Cook\u27s scheme for their basic polynomial-time functionals. We show that if P = NP, these polynomial-time effective operations are strictly more powerful on R (the class of recursive functions) than the basic feasible functions. We also consider a weaker notion of polynomial-time effective operation where the machines computing these functionals have access to the computations of their procedural parameter, but not to its program text. For this version of polynomial-time eff...
none2siPolynomial interpretations and their generalizations like quasi-interpretations have been use...
This book is a development of class notes for a two-hour lecture including a two-hour lab held for s...
AbstractBased on Valiant's class #P of all functions counting the number of accepting computations o...
This paper investigates analogs of the Kreisel-Lacombe-Shoenfield Theorem in the context of the type...
AbstractThis paper investigates analogs of the Kreisel–Lacombe–Shoenfield Theorem in the context of ...
This paper introduces a more restrictive notion of feasibility of functionals on Baire space than th...
This paper provides an alternate characterization of type-two polynomial-time computability, with th...
AbstractTownsend introduced a resource-bounded extension of polynomial-time computable functions on ...
This paper provides a criterion based on interpretation methods on term rewrite systems in order to ...
International audienceWe study polynomial time complexity of type 2 functionals. For that purpose, w...
The outcomes of this article are twofold. Implicit complexity. We provide an implicit characterizati...
In this paper we study (self-)applicative theories of operations and binary words in the context of ...
This article provides a survey of key papers that characterise computable functions, but also provid...
In higher-type computation, established by Kleene and Kreisel in the late 1950\u27s (independently),...
International audienceRecursive analysis was introduced by A. Turing [1936], A. Grzegorczyk [1955], ...
none2siPolynomial interpretations and their generalizations like quasi-interpretations have been use...
This book is a development of class notes for a two-hour lecture including a two-hour lab held for s...
AbstractBased on Valiant's class #P of all functions counting the number of accepting computations o...
This paper investigates analogs of the Kreisel-Lacombe-Shoenfield Theorem in the context of the type...
AbstractThis paper investigates analogs of the Kreisel–Lacombe–Shoenfield Theorem in the context of ...
This paper introduces a more restrictive notion of feasibility of functionals on Baire space than th...
This paper provides an alternate characterization of type-two polynomial-time computability, with th...
AbstractTownsend introduced a resource-bounded extension of polynomial-time computable functions on ...
This paper provides a criterion based on interpretation methods on term rewrite systems in order to ...
International audienceWe study polynomial time complexity of type 2 functionals. For that purpose, w...
The outcomes of this article are twofold. Implicit complexity. We provide an implicit characterizati...
In this paper we study (self-)applicative theories of operations and binary words in the context of ...
This article provides a survey of key papers that characterise computable functions, but also provid...
In higher-type computation, established by Kleene and Kreisel in the late 1950\u27s (independently),...
International audienceRecursive analysis was introduced by A. Turing [1936], A. Grzegorczyk [1955], ...
none2siPolynomial interpretations and their generalizations like quasi-interpretations have been use...
This book is a development of class notes for a two-hour lecture including a two-hour lab held for s...
AbstractBased on Valiant's class #P of all functions counting the number of accepting computations o...