AbstractIn this paper, we present a complete formalization in the Coq theorem prover of an important algorithm in computational algebra, namely the calculation of the effective homology of a bicomplex. As a necessary tool, we encode a hierarchy of algebraic structures in constructive type theory, including graded and infinite data structures. The experience shows how some limitations of the Coq proof assistant to deal with this kind of algebraic data can be overcome by applying a separation of concerns principle; more concretely, we propose to distinguish in the representation of an algebraic structure (such as a group or a module) a behavioural part, containing operation signatures and axioms, and a structural part determining if the algeb...
We describe our experience implementing a broad category-theory library in Coq. Category theory and ...
International audienceThis paper reports on ongoing work on the project of representing the Kenzo sy...
This paper presents a formalization of constructive module theory in the intuitionistic type theory ...
In this paper, we present a complete formalization in the Coq theorem prover of an important algorit...
AbstractIn this paper, we present a complete formalization in the Coq theorem prover of an important...
Computational content encoded into constructive type theory proofs can be used to make computing exp...
The object of this thesis is the study of the ability of the Coq system to mix proofs and programs i...
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 audienceWe describe a step-by-step approach to the implementation and formal verificat...
The extensive use of computers in mathematics and engineering has led to an increased demand for rel...
Persistent homology is one of the most active branches of computational algebraic topology with appl...
In this article we present a method for formally proving the correctness ofthe lazy algorithms for c...
The Coq system is a proof assistant based on the Calculus of InductiveConstructions. In this work, w...
summary:We extend the notion of simplicial set with effective homology presented in [22] to diagrams...
We describe our experience implementing a broad category-theory library in Coq. Category theory and ...
International audienceThis paper reports on ongoing work on the project of representing the Kenzo sy...
This paper presents a formalization of constructive module theory in the intuitionistic type theory ...
In this paper, we present a complete formalization in the Coq theorem prover of an important algorit...
AbstractIn this paper, we present a complete formalization in the Coq theorem prover of an important...
Computational content encoded into constructive type theory proofs can be used to make computing exp...
The object of this thesis is the study of the ability of the Coq system to mix proofs and programs i...
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 audienceWe describe a step-by-step approach to the implementation and formal verificat...
The extensive use of computers in mathematics and engineering has led to an increased demand for rel...
Persistent homology is one of the most active branches of computational algebraic topology with appl...
In this article we present a method for formally proving the correctness ofthe lazy algorithms for c...
The Coq system is a proof assistant based on the Calculus of InductiveConstructions. In this work, w...
summary:We extend the notion of simplicial set with effective homology presented in [22] to diagrams...
We describe our experience implementing a broad category-theory library in Coq. Category theory and ...
International audienceThis paper reports on ongoing work on the project of representing the Kenzo sy...
This paper presents a formalization of constructive module theory in the intuitionistic type theory ...