Based on a new coinductive characterization of continuous functions we extract certified programs for exact real number computation from constructive proofs. The extracted programs construct and combine exact real number algorithms with respect to the binary signed digit representation of real numbers. The data type corresponding to the coinductive definition of continuous functions consists of finitely branching non-wellfounded trees describing when the algorithm writes and reads digits. We discuss several examples including the extraction of programs for polynomials up to degree two and the definite integral of continuous maps.</p
We use ideas from computable analysis to formalize exact real number computation in the Coq proof as...
International audienceWe describe here a representation of computable real numbers and a set of algo...
AbstractWe describe here a representation of computable real numbers and a set of algorithms for the...
Based on a new coinductive characterization of continuous functions weextract certified programs for...
We present an approach to verified programs for exact real number computation that is based on indu...
This paper studies coinductive representations of real numbers bysigned digit streams and fast Cauch...
In this article we present a method for formally proving the correctness ofthe lazy algorithms for c...
We study a realisability interpretation for inductive and coinductive definitions and discuss its ap...
AbstractWe implement exact real numbers in the logical framework Coq using streams, i.e., infinite s...
Real number computation in modern computers is mostly done via floating point arithmetic which can s...
We extract verified algorithms for exact real number computation fromconstructive proofs. To this en...
We introduce a new axiomatization of the constructive real numbers in a dependent type theory. Our m...
In this paper we will discuss various aspects of computable/constructive analysis, namely semantics,...
We prove the correctness of a formalised realisability interpretation of extensions of first-order t...
AbstractIn this article we present a method to define algebraic structure (field operations) on a re...
We use ideas from computable analysis to formalize exact real number computation in the Coq proof as...
International audienceWe describe here a representation of computable real numbers and a set of algo...
AbstractWe describe here a representation of computable real numbers and a set of algorithms for the...
Based on a new coinductive characterization of continuous functions weextract certified programs for...
We present an approach to verified programs for exact real number computation that is based on indu...
This paper studies coinductive representations of real numbers bysigned digit streams and fast Cauch...
In this article we present a method for formally proving the correctness ofthe lazy algorithms for c...
We study a realisability interpretation for inductive and coinductive definitions and discuss its ap...
AbstractWe implement exact real numbers in the logical framework Coq using streams, i.e., infinite s...
Real number computation in modern computers is mostly done via floating point arithmetic which can s...
We extract verified algorithms for exact real number computation fromconstructive proofs. To this en...
We introduce a new axiomatization of the constructive real numbers in a dependent type theory. Our m...
In this paper we will discuss various aspects of computable/constructive analysis, namely semantics,...
We prove the correctness of a formalised realisability interpretation of extensions of first-order t...
AbstractIn this article we present a method to define algebraic structure (field operations) on a re...
We use ideas from computable analysis to formalize exact real number computation in the Coq proof as...
International audienceWe describe here a representation of computable real numbers and a set of algo...
AbstractWe describe here a representation of computable real numbers and a set of algorithms for the...