Philippe Langevin scite author profile

Philippe Langevin

5Publications

118Citation Statements Received

58Citation Statements Given

How they've been cited

271

117

How they cite others

Affiliations

Université de Toulon, Collège de France, Université Côte d'Azur

Publications

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On the Weights of Binary Irreducible Cyclic Codes

Aubry

Langevin

2006

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Abstract. This paper is devoted to the study of the weights of binary irreducible cyclic codes. We start from McEliece's interpretation of these weights by means of Gauss sums. Firstly, a dyadic analysis, using the Stickelberger congruences and the Gross-Koblitz formula, enables us to improve McEliece's divisibility theorem by giving results on the multiplicity of the weights. Secondly, in connection with a Schmidt and White's conjecture, we focus on binary irreducible cyclic codes of index two. We show, assuming the generalized Riemann hypothesis, that there are an infinite of such codes. Furthermore, we consider a subclass of this family of codes satisfying the quadratic residue conditions. The parameters of these codes are related to the class number of some imaginary quadratic number fields. We prove the non existence of such codes which provide us a very elementary proof, without assuming G.R.H, that any two-weight binary irreducible cyclic code c(m, v) of index two with v prime greater that three is semiprimitive.

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Calculs de Certaines Sommes de Gauss

Langevin

1997

Journal of Number Theory

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Sur les biréfringences électrique et magnétique

Langevin

1910

Radium (Paris)

154

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Results on Bent Functions

Hou

Langevin

1997

Journal of Combinatorial Theory, Series A

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Cyclotomy of Weil sums of binomials

Aubry

Katz

Langevin

2015

Journal of Number Theory

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Abstract. The Weil sum W K,d (a) = x∈K ψ(x d + ax) where K is a finite field, ψ is an additive character of K, d is coprime to |K × |, and a ∈ K × arises often in number-theoretic calculations, and in applications to finite geometry, cryptography, digital sequence design, and coding theory. Researchers are especially interested in the case where W K,d (a) assumes three distinct values as a runs through K × . A Galois-theoretic approach, combined with p-divisibility results on Gauss sums, is used here to prove a variety of new results that constrain which fields K and exponents d support three-valued Weil sums, and restrict the values that such Weil sums may assume.

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