Rigid cohomology and p-adic point counting

Alan G.B. Lauder

Journal ArticleOPEN ACCESS

Rigid cohomology and p-adic point counting

Lauder A

Journal de Theorie des Nombres de Bordeaux (2005) 17(1) 169-180

DOI: 10.5802/jtnb.484

7Citations

5Readers

Abstract

I discuss some algorithms for computing the zeta function of an algebraic variety over a finite field which are based upon rigid cohomology. Two distinct approaches are illustrated with a worked example.

References Powered by Scopus

View more at Scopus

Cited by Powered by Scopus

View more at Scopus

Cite

CITATION STYLE

APA

Lauder, A. G. B. (2005). Rigid cohomology and p-adic point counting. Journal de Theorie Des Nombres de Bordeaux, 17(1), 169–180. https://doi.org/10.5802/jtnb.484

Readers' Seniority

Professor / Associate Prof. 2

40%

Researcher 2

40%

Lecturer / Post doc 1

20%

Readers' Discipline

Mathematics 5

100%

Rigid cohomology and p-adic point counting

Abstract

References Powered by Scopus

Elliptic curves over finite fields and the computation of square roots mod p

Frobenius maps of abelian varieties and finding roots of unity in finite fields

On exponential sums in finite fields, II

Cited by Powered by Scopus

Generating genus two hyperelliptic curves over large characteristic finite fields

A numerical approach toward the p-adic Beilinson conjecture for elliptic curves over Q

Effective convergence bounds for frobenius structures on connections

Register to see more suggestions

Cite

Readers' Seniority

Readers' Discipline