Starting from the definitions of predicative recursion and constructive diagonalization, we recall our specialized programming language that provides a resource-free characterization of register machines computing their output within polynomial time O(n^k), and exponential time O(n^n^k), for each finite k. We discuss the possibility of extending this characterization to a transfinite hierarchy of programs that captures the Grzegorczyk hierarchy of functions at elementary level. This is done by means of predicative operators, contrasting to previous results. We discuss the feasibility and the complexity of our diagonalization operator
We provide machine-independent characterizations of some complexity classes, over an arbitrary struc...
Determining the computational complexity of problems is a large area of study. It seeks to separate ...
AbstractGrzegorczyk (1953) defines a recursive hierarchy fi(x). The diagonal function fx(x) majorize...
By means of the definition of predicative recursion, we introduce a programming language that provid...
Starting from the definitions of predicative recursion and constructive diagonalization, we recall o...
International audiencePredicative analysis of recursion schema is a method to characterize complexit...
We provide a resource-free characterization of register machines that computes their output within p...
In this paper we study diagonal processes over time-bounded computations of one-tape Turing machine...
AbstractResults are presented which show precise ways in which recursion rests on very simple comput...
AbstractIn this paper we study diagonal processes over time bounded computations of one-tape Turing ...
Diagonalization is a powerful technique in recursion the-ory and in computational complexity [2]. Th...
AbstractWe provide machine-independent characterizations of some complexity classes, over an arbitra...
We provide machine-independent characterizations of some complexity classes, over an arbitrary struc...
The purpose of this thesis is to give a "foundational" characterization of some common com...
In this thesis we examine some of the central problems in the theory of computational complexity, l...
We provide machine-independent characterizations of some complexity classes, over an arbitrary struc...
Determining the computational complexity of problems is a large area of study. It seeks to separate ...
AbstractGrzegorczyk (1953) defines a recursive hierarchy fi(x). The diagonal function fx(x) majorize...
By means of the definition of predicative recursion, we introduce a programming language that provid...
Starting from the definitions of predicative recursion and constructive diagonalization, we recall o...
International audiencePredicative analysis of recursion schema is a method to characterize complexit...
We provide a resource-free characterization of register machines that computes their output within p...
In this paper we study diagonal processes over time-bounded computations of one-tape Turing machine...
AbstractResults are presented which show precise ways in which recursion rests on very simple comput...
AbstractIn this paper we study diagonal processes over time bounded computations of one-tape Turing ...
Diagonalization is a powerful technique in recursion the-ory and in computational complexity [2]. Th...
AbstractWe provide machine-independent characterizations of some complexity classes, over an arbitra...
We provide machine-independent characterizations of some complexity classes, over an arbitrary struc...
The purpose of this thesis is to give a "foundational" characterization of some common com...
In this thesis we examine some of the central problems in the theory of computational complexity, l...
We provide machine-independent characterizations of some complexity classes, over an arbitrary struc...
Determining the computational complexity of problems is a large area of study. It seeks to separate ...
AbstractGrzegorczyk (1953) defines a recursive hierarchy fi(x). The diagonal function fx(x) majorize...