Add to ORKGInternational audienceThis article details a formalization in Coq of the Lindemann-Weierstrass theorem which gives a transcendence criterion for complex numbers: this theorem establishes a link between the linear independence of a set of algebraic numbers and the algebraic independence of the exponentials of these numbers. As we follow Baker's proof, we discuss the difficulties of its formalization and explain how we resolved them in Coq. Most of these difficulties revolve around multivariate polynomials and their relationship with the conjugates of a univariate polynomial. Their study ultimately leads to alternative forms of the fundamental theorem of symmetric polynomials. This formalization uses mainly the Mathcomp library for the part r...
Suppose we want to find the integral simple roots of a univariate polynomial with integer coefficien...
This book provides an introduction to the topic of transcendental numbers for upper-level undergradu...
Assuming Schanuel's conjecture, we prove that any polynomial–exponential equation in one variable mu...
International audienceWe describe the formalisation in Coq of a proof that the numbers e and π are t...
In our thesis, we study the proof of the Lindemann-Weierstrass Theorem from Jacobson’s Algebra book....
When reasoning formally with polynomials over real numbers, or more generally real closed fields, we...
sem informaçãoThis paper surveys some results on the role of formal polynomials as a representation ...
This thesis presents a formalization of algebraic numbers and their theory. It brings two new import...
Un problème de géométrie algébrique réelle s'exprime sous forme d’un système d’équations et d’inéqua...
International audienceThis paper describes a formalization of discrete real closed fields in the Coq...
AbstractBy a general degree argument V. Strassen has obtained sharp lower bounds for the number of m...
International audienceWe describe a step-by-step approach to the implementation and formal verificat...
This thesis provides a program to compute minimal values of polynomials of degree two to get a trans...
International audienceThis paper shows a construction in Coq of the set of real algebraic numbers, t...
International audienceHere we propose a survey on Mahler's theory for transcendence and algebraic in...
Suppose we want to find the integral simple roots of a univariate polynomial with integer coefficien...
This book provides an introduction to the topic of transcendental numbers for upper-level undergradu...
Assuming Schanuel's conjecture, we prove that any polynomial–exponential equation in one variable mu...
International audienceWe describe the formalisation in Coq of a proof that the numbers e and π are t...
In our thesis, we study the proof of the Lindemann-Weierstrass Theorem from Jacobson’s Algebra book....
When reasoning formally with polynomials over real numbers, or more generally real closed fields, we...
sem informaçãoThis paper surveys some results on the role of formal polynomials as a representation ...
This thesis presents a formalization of algebraic numbers and their theory. It brings two new import...
Un problème de géométrie algébrique réelle s'exprime sous forme d’un système d’équations et d’inéqua...
International audienceThis paper describes a formalization of discrete real closed fields in the Coq...
AbstractBy a general degree argument V. Strassen has obtained sharp lower bounds for the number of m...
International audienceWe describe a step-by-step approach to the implementation and formal verificat...
This thesis provides a program to compute minimal values of polynomials of degree two to get a trans...
International audienceThis paper shows a construction in Coq of the set of real algebraic numbers, t...
International audienceHere we propose a survey on Mahler's theory for transcendence and algebraic in...
Suppose we want to find the integral simple roots of a univariate polynomial with integer coefficien...
This book provides an introduction to the topic of transcendental numbers for upper-level undergradu...
Assuming Schanuel's conjecture, we prove that any polynomial–exponential equation in one variable mu...