We present a survey of the recent applications of continuous domains for providing simple computational models for classical spaces in mathematics including the real line, countably based locally compact spaces, complete separable metric spaces, separable Banach spaces and spaces of probability distributions. It is shown how these models have a logical and effective presentation and how they are used to give a computational framework in several areas in mathematics and physics. These include fractal geometry, where new results on existence and uniqueness of attractors and invariant distributions have been obtained, measure and integration theory, where a generalization of the Riemann theory of integration has been developed, and real arithm...
AbstractFor every metric space X, we define a continuous poset BX such that X is homeomorphic to the...
AbstractThis volume contains the proceedings of the Third Workshop on Computation and Approximation ...
Continuous complexity theory gets its name from the model of mathematical computation on which it is...
AbstractIn recent years, there has been a considerable amount of work on using continuous domains in...
In recent years, there has been a considerable amount of work on using continuous domains in real an...
AbstractThe real-number model of computation is used in computational geometry, in the approach sugg...
We present the different constructive definitions of real number that can be found in the literature...
AbstractWe present the different constructive definitions of real number that can be found in the li...
International audienceThis tutorial presents what kind of computation can be carried out inside a Eu...
The aim of this thesis is to contribute to close the gap existing between the theory of computable a...
AbstractBased on standard notions of classical recursion theory, a natural model of approximate comp...
AbstractA concrete model of computation for a topological algebra is based on a representation of th...
Abstract:- We present a method to build fractal structures, which is based on the use of periodic do...
This contributed volume provides readers with an overview of the most recent developments in the mat...
(eng) We study the computational capabilities of dynamical systems defined by iterated functions on ...
AbstractFor every metric space X, we define a continuous poset BX such that X is homeomorphic to the...
AbstractThis volume contains the proceedings of the Third Workshop on Computation and Approximation ...
Continuous complexity theory gets its name from the model of mathematical computation on which it is...
AbstractIn recent years, there has been a considerable amount of work on using continuous domains in...
In recent years, there has been a considerable amount of work on using continuous domains in real an...
AbstractThe real-number model of computation is used in computational geometry, in the approach sugg...
We present the different constructive definitions of real number that can be found in the literature...
AbstractWe present the different constructive definitions of real number that can be found in the li...
International audienceThis tutorial presents what kind of computation can be carried out inside a Eu...
The aim of this thesis is to contribute to close the gap existing between the theory of computable a...
AbstractBased on standard notions of classical recursion theory, a natural model of approximate comp...
AbstractA concrete model of computation for a topological algebra is based on a representation of th...
Abstract:- We present a method to build fractal structures, which is based on the use of periodic do...
This contributed volume provides readers with an overview of the most recent developments in the mat...
(eng) We study the computational capabilities of dynamical systems defined by iterated functions on ...
AbstractFor every metric space X, we define a continuous poset BX such that X is homeomorphic to the...
AbstractThis volume contains the proceedings of the Third Workshop on Computation and Approximation ...
Continuous complexity theory gets its name from the model of mathematical computation on which it is...