We describe a construction of the real numbers carried out in the Coq proof assistant. The basis is a set of axioms for the constructive real numbers as used in the FTA (Fundamental Theorem of Algebra) project, carried out at Nijmegen University. The aim of this work is to show that these axioms can be satisffied, by constructing a model for them. Apart from that, we show the robustness of the set of axioms for constructive real numbers, by proving (in Coq) that any two models of it are isomorphic. Finally, we show that our axioms are equivalent to the set of axioms for constructive reals introduced by Bridges in [2]. The construction of the reals is done in the ‘classical way’: first the rational numbers are built and they are shown to be ...
In the present paper, we will discuss various aspects of computable/constructive analysis, namely se...
There are two incompatible Coq libraries that have a theory of the real numbers; the Coq standard li...
There are two incompatible Coq libraries that have a theory of the real numbers; the Coq standard li...
We describe a construction of the real numbers carried out in the Coq proof assistant. The basis is ...
We describe a construction of the real numbers carried out in the Coq proof assistant. The basis is ...
Is it possible to give an abstract characterisation of constructive real numbers? This question may ...
International audienceThis paper shows a construction in Coq of the set of real algebraic numbers, t...
This paper describes a formalization of the first book of the series ``Elements of Mathematics'' b...
AbstractWe describe a framework of algebraic structures in the proof assistant Coq. We have develope...
We describe a framework of algebraic structures in the proof assistant Coq. We have developed this f...
International audienceThis paper describes a formalization of the first book of the series ``Elemen...
In this paper we will discuss various aspects of computable/constructive analysis, namely semantics,...
Constructive mathematics is mathematics without the use of the principle of the excluded middle. The...
This thesis presents a formalization of algebraic numbers and their theory. It brings two new import...
In the present paper, we will discuss various aspects of computable/constructive analysis, namely se...
There are two incompatible Coq libraries that have a theory of the real numbers; the Coq standard li...
There are two incompatible Coq libraries that have a theory of the real numbers; the Coq standard li...
We describe a construction of the real numbers carried out in the Coq proof assistant. The basis is ...
We describe a construction of the real numbers carried out in the Coq proof assistant. The basis is ...
Is it possible to give an abstract characterisation of constructive real numbers? This question may ...
International audienceThis paper shows a construction in Coq of the set of real algebraic numbers, t...
This paper describes a formalization of the first book of the series ``Elements of Mathematics'' b...
AbstractWe describe a framework of algebraic structures in the proof assistant Coq. We have develope...
We describe a framework of algebraic structures in the proof assistant Coq. We have developed this f...
International audienceThis paper describes a formalization of the first book of the series ``Elemen...
In this paper we will discuss various aspects of computable/constructive analysis, namely semantics,...
Constructive mathematics is mathematics without the use of the principle of the excluded middle. The...
This thesis presents a formalization of algebraic numbers and their theory. It brings two new import...
In the present paper, we will discuss various aspects of computable/constructive analysis, namely se...
There are two incompatible Coq libraries that have a theory of the real numbers; the Coq standard li...
There are two incompatible Coq libraries that have a theory of the real numbers; the Coq standard li...