Title | ||
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Formal proofs of transcendence for e and pi as an application of multivariate and symmetric polynomials. |
Abstract | ||
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We describe the formalisation in Coq of a proof that the numbers `e` and `pi` are transcendental. This proof lies at the interface of two domains of mathematics that are often considered separately: calculus (real and elementary complex analysis) and algebra. For the work on calculus, we rely on the Coquelicot library and for the work on algebra, we rely on the Mathematical Components library. Moreover, some of the elements of our formalized proof originate in the more ancient library for real numbers included in the Coq distribution. The case of `pi` relies extensively on properties of multivariate polynomials and this experiment was also an occasion to put to test a newly developed library for these multivariate polynomials.
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Year | DOI | Venue |
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2016 | 10.1145/2854065.2854072 | CPP 2016: Certified Proofs and Programs
St. Petersburg
FL
USA
January, 2016 |
Keywords | Field | DocType |
Coq, Proof Assistant, Formal Mathematics, Transcendence, Multivariate Polynomials | Pi,Algebra,Multivariate statistics,Algorithm,Mathematical proof,Transcendental number,Symmetric polynomial,Real number,Multivariate polynomials,Mathematics,Proof assistant | Conference |
ISBN | Citations | PageRank |
978-1-4503-4127-1 | 4 | 0.49 |
References | Authors | |
4 | 4 |
Name | Order | Citations | PageRank |
---|---|---|---|
Sophie Bernard | 1 | 4 | 0.82 |
Yves Bertot | 2 | 442 | 40.82 |
Laurence Rideau | 3 | 253 | 16.08 |
Pierre-Yves Strub | 4 | 540 | 29.87 |