Quasinormalität in topologischen Gruppen.
Quasi-reductive (bi)parabolic subalgebras in reductive Lie algebras.
We say that a finite dimensional Lie algebra is quasi-reductive if it has a linear form whose stabilizer for the coadjoint representation, modulo the center, is a reductive Lie algebra with a center consisting of semisimple elements. Parabolic subalgebras of a semisimple Lie algebra are not always quasi-reductive (except in types A or C by work of Panyushev). The classification of quasi-reductive parabolic subalgebras in the classical case has been recently achieved in unpublished work of Duflo,...
Quaternion quantum theory as a description of tachyons and the symmetry breaking
Quelques applications de la cohomologie d'intersection
Quelques notions sur l'équirépartition dans les groupes abéliens compacts et localement compacts
Quelques propriétés arithmétiques de certaines formes automorphes sur GL
Quelques questions sur les intégrales orbitales unipotentes et les algèbres de Hecke
Quotient groups of linear topological spaces
Quotients compacts des groupes ultramétriques de rang un
Soit l’ensemble des points d’un groupe algébrique semi-simple connexe de rang relatif un sur un corps local ultramétrique. Nous décrivons tous les sous-groupes discrets de type fini sans torsion de qui agissent proprement et cocompactement sur par multiplication à gauche et à droite. Nous montrons qu’après une petite déformation dans un tel sous-groupe agit encore librement, proprement discontinûment et cocompactement sur .
Quotients of compact 0-dimensional semigroups and groupoids.
Quotients of k-semigroups.
Quotients of locally compact semigroups.
Quotients of Strongly Realcompact Groups
A topological group is strongly realcompact if it is topologically isomorphic to a closed subgroup of a product of separable metrizable groups. We show that if H is an invariant Čech-complete subgroup of an ω-narrow topological group G, then G is strongly realcompact if and only if G/H is strongly realcompact. Our proof of this result is based on a thorough study of the interaction between the P-modification of topological groups and the operation of taking quotient groups.
QUOTIENTS OF UNIFORM SEMIGROUPS.