There are two incompatible Coq libraries that have a theory of the real numbers; the Coq standard library gives an axiomatic treatment of classical real numbers, while the CoRN library from Nijmegen defines constructively valid real numbers. Unfortunately, this means results about one structure cannot easily be used in the other structure. We present a way interfacing these two libraries by showing that their real number structures are isomorphic assuming the classical axioms already present in the standard library reals. This allows us to use O'Connor's decision procedure for solving ground inequalities present in CoRN to solve inequalities about the reals from the Coq standard library, and it allows theorems from the Coq standard library ...
This paper describes a formalization of the first book of the series ``Elements of Mathematics'' b...
Real number computation in modern computers is mostly done via floating point arithmetic which can s...
Abstract. Real analysis is pervasive to many applications, if only because it is a suitable tool for...
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...
L'analyse réelle a de nombreuses applications car c'est un outil approprié pour modéliser de nombreu...
In the recent years, numerous proof systems have improved enough to be used for formally verifying n...
International audienceIn the recent years, numerous proof systems have improved enough to be used fo...
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...
We describe a construction of the real numbers carried out in the Coq proof assistant. The basis is ...
International audienceThis paper describes a formalization of the first book of the series ``Elemen...
International audienceThis paper shows a construction in Coq of the set of real algebraic numbers, t...
Mathematical Components is the name of a library of formalized mathematics for the Coq system. It co...
Abstract. Floating point operations are fast, but require continuous effort by the user to ensure co...
This paper describes a formalization of the first book of the series ``Elements of Mathematics'' b...
Real number computation in modern computers is mostly done via floating point arithmetic which can s...
Abstract. Real analysis is pervasive to many applications, if only because it is a suitable tool for...
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...
L'analyse réelle a de nombreuses applications car c'est un outil approprié pour modéliser de nombreu...
In the recent years, numerous proof systems have improved enough to be used for formally verifying n...
International audienceIn the recent years, numerous proof systems have improved enough to be used fo...
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...
We describe a construction of the real numbers carried out in the Coq proof assistant. The basis is ...
International audienceThis paper describes a formalization of the first book of the series ``Elemen...
International audienceThis paper shows a construction in Coq of the set of real algebraic numbers, t...
Mathematical Components is the name of a library of formalized mathematics for the Coq system. It co...
Abstract. Floating point operations are fast, but require continuous effort by the user to ensure co...
This paper describes a formalization of the first book of the series ``Elements of Mathematics'' b...
Real number computation in modern computers is mostly done via floating point arithmetic which can s...
Abstract. Real analysis is pervasive to many applications, if only because it is a suitable tool for...