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Displaying 121 – 140 of 153

Local semigroups

Bohumil Šmarda (1986)

Czechoslovak Mathematical Journal

Local Shimura Correspondence.

Gordan Savin (1988)

Mathematische Annalen

Local tame lifting for $G L (N)$ . I: Simple characters

Colin J. Bushnell, Guy Henniart (1996)

Publications Mathématiques de l'IHÉS

Local-global compatibility for $l = p$ , I

Thomas Barnet-Lamb, Toby Gee, David Geraghty, Richard Taylor (2012)

Annales de la faculté des sciences de Toulouse Mathématiques

We prove the compatibility of the local and global Langlands correspondences at places dividing $l$ for the $l$ -adic Galois representations associated to regular algebraic conjugate self-dual cuspidal automorphic representations of ${GL}_{n}$ over an imaginary CM field, under the assumption that the automorphic representations have Iwahori-fixed vectors at places dividing $l$ and have Shin-regular weight.

Localisation des sommes de Riesz sur un groupe de Lie compact

Jean Clers (1976)

Studia Mathematica

Localization and Standard modules for real semisimple Lie groups, I: The duality theorem.

W. Schmid, H. Hecht, D. Milicic (1987)

Inventiones mathematicae

Locally analytic vectors of unitary principal series of ${GL}_{2} (ℚ_{p})$

Ruochuan Liu, Bingyong Xie, Yuancao Zhang (2012)

Annales scientifiques de l'École Normale Supérieure

The $p$ -adic local Langlands correspondence for ${GL}_{2} (ℚ_{p})$ attaches to any $2$ -dimensional irreducible $p$ -adic representation $V$ of $G_{ℚ_{p}}$ an admissible unitary representation $Π (V)$ of ${GL}_{2} (ℚ_{p})$ . The unitary principal series of ${GL}_{2} (ℚ_{p})$ are those $Π (V)$ corresponding to trianguline representations. In this article, for $p > 2$ , using the machinery of Colmez, we determine the space of locally analytic vectors $Π {(V)}_{an}$ for all non-exceptional unitary principal series $Π (V)$ of ${GL}_{2} (ℚ_{p})$ by proving a conjecture of Emerton.

Locally compact bisimple inverse semigroups.

K.R. Ahre (1981)

Semigroup forum

Locally compact F-spaces, sub-stonean spaces and quotients of locally compact groups.

Esben T. Kehlet (1991)

Mathematica Scandinavica

Locally Compact Groups Acting on Trees and Property T.

Roger Alperin (1982)

Monatshefte für Mathematik

Locally compact groups and β-varieties of topological groups

Sidney Morris (1973)

Fundamenta Mathematicae

Locally compact quantum groups

Johan Kustermans, Stefaan Vaes (2000)

Annales scientifiques de l'École Normale Supérieure

Locally compact subgroups of the spectrum of the measure algebra III.

C. Dunkl, D. Ramirez (1972)

Semigroup forum

Locally Continuous Multipliers for Topological Vector Groups.

U. Cattaneo (1979)

Mathematische Annalen

Locally finite approximation of Lie groups, I.

Guido Mislin, Eric M. Friedlander (1986)

Inventiones mathematicae

Locally finitely generated differential spaces of class $C^{r}$

Borgiel, Włodzimierz, Buchner, Klaus, Sasin, Wiesław (1991)

Proceedings of the Winter School "Geometry and Physics"

Locally minimal topological groups and their embeddings into products of $o$ -bounded groups

Taras O. Banakh (2000)

Commentationes Mathematicae Universitatis Carolinae

It is proven that an infinite-dimensional Banach space (considered as an Abelian topological group) is not topologically isomorphic to a subgroup of a product of $σ$ -compact (or more generally, $o$ -bounded) topological groups. This answers a question of M. Tkachenko.

Locally partially ordered groups

J. Blair Roll (1993)

Czechoslovak Mathematical Journal

Locally solid topological lattice-ordered groups

Liang Hong (2015)

Archivum Mathematicum

Locally solid Riesz spaces have been widely investigated in the past several decades; but locally solid topological lattice-ordered groups seem to be largely unexplored. The paper is an attempt to initiate a relatively systematic study of locally solid topological lattice-ordered groups. We give both Roberts-Namioka-type characterization and Fremlin-type characterization of locally solid topological lattice-ordered groups. In particular, we show that a group topology on a lattice-ordered group is...

Lokalkreisförmige Vektorgruppen.

Pawel Lurje (1974)

Manuscripta mathematica

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