Computable analysis has been well studied ever since Turing famously formalised the computable reals and computable real-valued function in 1936. However, analysis is a broad subject, and there still exist areas that have yet to be explored. For instance, Sierpinski proved that every real-valued function ƒ : ℝ → ℝ is the limit of a sequence of Darboux functions. This is an intriguing result, and the complexity of these sequences has been largely unstudied. Similarly, the Blaschke Selection Theorem, closely related to the Bolzano-Weierstrass Theorem, has great practical importance, but has not been considered from a computability theoretic perspective. The two main contributions of this thesis are: to provide some new, simple proofs of funda...
As a part of our works on effective properties of probability distributions,we deal with the corresp...
For knowing that a function f: Nk → N is computable one does not need a definition of what is comput...
Computability and continuity are closely linked - in fact, continuity can be seen as computability r...
Computable analysis has been well studied ever since Turing famously formalised the computable reals...
AbstractThis paper deals with the computability in analysis within the framework of Grzegorczyk's hi...
Computability and Complexity in Analysis (CCA) investigates the fundamental capabilities and limitat...
We investigate Turing’s contributions to computability theory for real numbers and real functions p...
We provide a self-contained introduction into Weihrauch complexity and its applications to computabl...
In this paper, I present an introduction to computability theory and adopt contemporary mathematical...
AbstractThe functions of Computable Analysis are defined by enhancing the capacities of normal Turin...
In this paper we study a new approach to classify mathematical theorems ac- cording to their comput...
Broad in coverage, mathematically sophisticated, and up to date, this book provides an introduction ...
In this article we develop a theory of computation for continuous mathematics. The theory is based o...
AbstractIn this paper we extend computability theory to the spaces of continuous, upper semi-continu...
AbstractThe functions of computable analysis are defined by enhancing normal Turing machines to deal...
As a part of our works on effective properties of probability distributions,we deal with the corresp...
For knowing that a function f: Nk → N is computable one does not need a definition of what is comput...
Computability and continuity are closely linked - in fact, continuity can be seen as computability r...
Computable analysis has been well studied ever since Turing famously formalised the computable reals...
AbstractThis paper deals with the computability in analysis within the framework of Grzegorczyk's hi...
Computability and Complexity in Analysis (CCA) investigates the fundamental capabilities and limitat...
We investigate Turing’s contributions to computability theory for real numbers and real functions p...
We provide a self-contained introduction into Weihrauch complexity and its applications to computabl...
In this paper, I present an introduction to computability theory and adopt contemporary mathematical...
AbstractThe functions of Computable Analysis are defined by enhancing the capacities of normal Turin...
In this paper we study a new approach to classify mathematical theorems ac- cording to their comput...
Broad in coverage, mathematically sophisticated, and up to date, this book provides an introduction ...
In this article we develop a theory of computation for continuous mathematics. The theory is based o...
AbstractIn this paper we extend computability theory to the spaces of continuous, upper semi-continu...
AbstractThe functions of computable analysis are defined by enhancing normal Turing machines to deal...
As a part of our works on effective properties of probability distributions,we deal with the corresp...
For knowing that a function f: Nk → N is computable one does not need a definition of what is comput...
Computability and continuity are closely linked - in fact, continuity can be seen as computability r...