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Elliptic curves with complex multiplication and Galois module structure.

Anupam Srivastav, Martin J. Taylor (1990)

Inventiones mathematicae

Equivariant Euler characteristics and sheaf resolvents

Ph. Cassou-Noguès, M.J. Taylor (2012)

Annales de l’institut Fourier

For certain tame abelian covers of arithmetic surfaces we obtain formulas, involving a quadratic form derived from intersection numbers, for the equivariant Euler characteristics of both the canonical sheaf and also its square root. These formulas allow us to carry out explicit calculations; in particular, we are able to exhibit examples where these two Euler characteristics and that of the structure sheaf are all different and non-trivial. Our results are obtained by using resolvent techniques...

Equivariant Weierstrass preparation and values of $L$ -functions at negative integers.

Burns, David, Greither, Cornelius (2003)

Documenta Mathematica

Espaces homogènes principaux, unités elliptiques et fonctions $L$

Philippe Cassou-Noguès, Martin J. Taylor (1994)

Annales de l'institut Fourier

Nous étudions la structure de certains espaces homogènes principaux associés aux éléments du groupe de Selmer d’une courbe elliptique à multiplication complexe. Nous utilisons des résultats de Rubin pour construire, à partir des unités elliptiques, des espaces homogènes principaux de structure galoisienne non triviale. Cette construction fournit un lien nouveau entre un problème de structure galoisienne et certaines fonctions $L - p$ -adiques.

Existence of and computation of integral bases

Erich Lamprecht (1998)

Acta Mathematica et Informatica Universitatis Ostraviensis

Displaying 1 – 5 of 5

Elliptic curves with complex multiplication and Galois module structure.

Equivariant Euler characteristics and sheaf resolvents

Equivariant Weierstrass preparation and values of L -functions at negative integers.

Espaces homogènes principaux, unités elliptiques et fonctions L

Existence of and computation of integral bases

Currently displaying 1 – 5 of 5

Equivariant Weierstrass preparation and values of $L$ -functions at negative integers.

Espaces homogènes principaux, unités elliptiques et fonctions $L$