In the representation approach to computable analysis (TTE) [Grz55, KW85, Wei00], abstract data like rational numbers, real numbers, compact sets or continuous real functions are represented by finite or infinite sequences (Σ*, Σω) of symbols, which serve as concrete names. A function on abstract data is called computable, if it can be realized by a computable function on names. It is the purpose of this article to justify and generalize methods which are already used informally in computable analysis for proving computability. As a simple formalization of informal programming we consider flowcharts with indirect addressing. Using the fact that every computable function on Σω can be generated by a monotone and computable function on Σ* we p...
In computable analysis, sequences of rational numbers which effectively converge to a real number x ...
[1955]. It is based on a discrete mechanical framework that can be used to model computation over th...
In this paper we define the notion of an abstract (Z, Q)-machine, which is a mathematical model for ...
We introduce a new type of generalized Turing machines (GTMs), which areintended as a tool for the m...
AbstractIn this paper we extend computability theory to the spaces of continuous, upper semi-continu...
Abstract. In this paper, we study computability and complexity of real functions. We extend these no...
AbstractGiven a strictly increasing computable sequence (called a base sequence) of real numbers (wi...
Computable analysis studies problems involving real numbers, sets and functions from the viewpoint o...
We introduce majorant computability of functions on reals. A structural theorem is proved, which con...
AbstractWe give a correspondence between two notions of complexity for real functions: poly-time com...
International audienceRecursive analysis was introduced by A. Turing [1936], A. Grzegorczyk [1955], ...
AbstractThe functions of computable analysis are defined by enhancing normal Turing machines to deal...
AbstractThis paper deals with the computability in analysis within the framework of Grzegorczyk's hi...
In this paper, we investigate the problem of synthesizing computable functions of infinite words ove...
In this paper we investigate continuous and upper and lower semi-continuous real functions in the fr...
In computable analysis, sequences of rational numbers which effectively converge to a real number x ...
[1955]. It is based on a discrete mechanical framework that can be used to model computation over th...
In this paper we define the notion of an abstract (Z, Q)-machine, which is a mathematical model for ...
We introduce a new type of generalized Turing machines (GTMs), which areintended as a tool for the m...
AbstractIn this paper we extend computability theory to the spaces of continuous, upper semi-continu...
Abstract. In this paper, we study computability and complexity of real functions. We extend these no...
AbstractGiven a strictly increasing computable sequence (called a base sequence) of real numbers (wi...
Computable analysis studies problems involving real numbers, sets and functions from the viewpoint o...
We introduce majorant computability of functions on reals. A structural theorem is proved, which con...
AbstractWe give a correspondence between two notions of complexity for real functions: poly-time com...
International audienceRecursive analysis was introduced by A. Turing [1936], A. Grzegorczyk [1955], ...
AbstractThe functions of computable analysis are defined by enhancing normal Turing machines to deal...
AbstractThis paper deals with the computability in analysis within the framework of Grzegorczyk's hi...
In this paper, we investigate the problem of synthesizing computable functions of infinite words ove...
In this paper we investigate continuous and upper and lower semi-continuous real functions in the fr...
In computable analysis, sequences of rational numbers which effectively converge to a real number x ...
[1955]. It is based on a discrete mechanical framework that can be used to model computation over th...
In this paper we define the notion of an abstract (Z, Q)-machine, which is a mathematical model for ...