• Aucun résultat trouvé

ERRATA: QUADRATIC FORMS THAT REPRESENT ALMOST THE SAME PRIMES

N/A
N/A
Protected

Academic year: 2022

Partager "ERRATA: QUADRATIC FORMS THAT REPRESENT ALMOST THE SAME PRIMES"

Copied!
1
0
0

Texte intégral

(1)

ERRATA:

QUADRATIC FORMS THAT REPRESENT ALMOST THE SAME PRIMES

JOHN VOIGHT

This note gives errata for the article Quadratic forms that represent almost the same primes [1]. The author would like to thank Hans Parshall.

(1) Table 13: Table 13 contains the duplicate entry 6820, one of which should be replaced by 7035.

(2) Appendix: There is a stray comma in the last paragraph, and it should read justc∈ {−1,±3}.

References

[1] John Voight, Quadratic forms that represent almost the same primes, Math. Comp.76 (2007), 1589–1617.

Date: July 19, 2018.

1

Références

Documents relatifs

Soit X un sch´ema projectif sur un corps alg´ebriquement clos de caract´eristique 6= 2. Cette application est surjective puisque γ est partout non nulle.. est l’application

In making it harder for poor people to access health insurance, Republicans aren’t just insulting and endangering the most vulnerable Americans, they’re literally

Using Hooley's method and the earlier estimate of Klooster- man, a weaker result could be derived which would still be sufficient for our purpose... QUADRATIC POLYNOM-f~,LS

The foregoing analysis provides a 'local' method for the evaluation of Dm ana- logous to that provided by ordinary simple continued fractions for corresponding

There we were mainly concerned with finding the inhomogeneous minimum M (/) of a rational indefinite binary quadratic form; and occasionally the methods yielded

My thanks are also due to the Royal Commission of ISSI Exhibi- tion for the Overseas Science :Research Scholar'ship that enabled me to work at the University

An asymptotic estimate for the number of integers which are represented by a given binary form is due to Landau, Ramanujan and Bernays for positive definite quadratic forms and

- A 2-dimensional Brownian motion, run for infinite time, almost surely contains no line segment... similarly the probability of covering at least 0N of these N