International audienceThis paper describes a formalization of the first book of the series ``Elements of Mathematics'' by Nicolas Bourbaki, using the Coq proof assistant. In a first paper published in this journal, we presented the axioms and basic constructions (corresponding to a part of the first two chapters of book I, theory of sets). We discuss here the set of integers (third chapter of book I, theory of set), the sets Z and Q (first chapter of book II, Algebra) and the set of real numbers (Chapter 4 of book III, General topology). We start with a comparison of the Bourbaki approach, the Coq standard library, and the Ssreflect library, then present our implementation
There are two incompatible Coq libraries that have a theory of the real numbers; the Coq standard li...
International audienceThis paper shows a construction in Coq of the set of real algebraic numbers, t...
Comes with a tar archive containing updated versions of the Coq proof files which were previously at...
This paper describes a formalization of the first book of the series ``Elements of Mathematics'' b...
This paper presents a formalization of the first book of the series ``Elements of Mathematics'' by ...
We believe that it is possible to put the whole work of Bourbaki into a computer. One of the objecti...
This document is a follow-up to two research reports explaining the implementation in the Coq proof...
Mathematical Components is the name of a library of formalized mathematics for the Coq system. It co...
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 ...
Floating point operations are fast, but require continuous effort on the partof the user in order to...
Abstract. Floating point operations are fast, but require continuous effort by the user to ensure co...
International audienceHydras & Co. is a collaborative library of discrete mathematics for the Coq pr...
We believe that it is possible to put the whole work of Bourbaki into a computer. One of the objecti...
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...
International audienceThis paper shows a construction in Coq of the set of real algebraic numbers, t...
Comes with a tar archive containing updated versions of the Coq proof files which were previously at...
This paper describes a formalization of the first book of the series ``Elements of Mathematics'' b...
This paper presents a formalization of the first book of the series ``Elements of Mathematics'' by ...
We believe that it is possible to put the whole work of Bourbaki into a computer. One of the objecti...
This document is a follow-up to two research reports explaining the implementation in the Coq proof...
Mathematical Components is the name of a library of formalized mathematics for the Coq system. It co...
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 ...
Floating point operations are fast, but require continuous effort on the partof the user in order to...
Abstract. Floating point operations are fast, but require continuous effort by the user to ensure co...
International audienceHydras & Co. is a collaborative library of discrete mathematics for the Coq pr...
We believe that it is possible to put the whole work of Bourbaki into a computer. One of the objecti...
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...
International audienceThis paper shows a construction in Coq of the set of real algebraic numbers, t...
Comes with a tar archive containing updated versions of the Coq proof files which were previously at...