AbstractUnitary groups of Hermitian forms with a hyperbolic rank at least one over local rings have been studied by D. G. James (J. Algebra 52 (1978), 354–363). Using his methods, we extend some of his results, i.e., generators, congruence subgroups and the classification of subgroups normalized by the Eichler subgroups to more general rings which contain semilocal rings
AbstractThis paper is devoted to determine the minimal length of expressions of an isometry in a sym...
AbstractIn a hypergroup, especially in the generalization called Hv-group, several convolutions can ...
For a real semisimple Lie group G, the description of the unitary dual remains an elusive question. ...
AbstractUnitary groups of Hermitian forms with a hyperbolic rank at least one over local rings have ...
AbstractWe deal with a hermitian space V over an involutorial division ring D with characteristic no...
Preusser R. The normal structure of hyperbolic unitary groups. Bielefeld: Universitätsbibliothek; 20...
AbstractSome sets of generators of unitary groups on a nonsingular Hermitian space with hyperbolic r...
AbstractLet L be a lattice over the integers of a local field F which has a nontrivial involution. T...
AbstractLet O be a semilocal domain that contains 2 as a unit. Let ∗ be an involution on O with the ...
AbstractIn this work, we deal with a Hermitian space V over an involutory division ring D with valua...
. This is the first in the series of papers dedicated to the structure of hyperbolic unitary groups ...
AbstractLet L be a lattice over the integers of a quaternion algebra with center K which is a B-adic...
AbstractFor a commutative ring with identity, we give a complete description of all overgroups of th...
summary:In this paper, we determine all the normal forms of Hermitian matrices over finite group rin...
We study hermitian forms and unitary groups defined over a local ring, not necessarily commutative, ...
AbstractThis paper is devoted to determine the minimal length of expressions of an isometry in a sym...
AbstractIn a hypergroup, especially in the generalization called Hv-group, several convolutions can ...
For a real semisimple Lie group G, the description of the unitary dual remains an elusive question. ...
AbstractUnitary groups of Hermitian forms with a hyperbolic rank at least one over local rings have ...
AbstractWe deal with a hermitian space V over an involutorial division ring D with characteristic no...
Preusser R. The normal structure of hyperbolic unitary groups. Bielefeld: Universitätsbibliothek; 20...
AbstractSome sets of generators of unitary groups on a nonsingular Hermitian space with hyperbolic r...
AbstractLet L be a lattice over the integers of a local field F which has a nontrivial involution. T...
AbstractLet O be a semilocal domain that contains 2 as a unit. Let ∗ be an involution on O with the ...
AbstractIn this work, we deal with a Hermitian space V over an involutory division ring D with valua...
. This is the first in the series of papers dedicated to the structure of hyperbolic unitary groups ...
AbstractLet L be a lattice over the integers of a quaternion algebra with center K which is a B-adic...
AbstractFor a commutative ring with identity, we give a complete description of all overgroups of th...
summary:In this paper, we determine all the normal forms of Hermitian matrices over finite group rin...
We study hermitian forms and unitary groups defined over a local ring, not necessarily commutative, ...
AbstractThis paper is devoted to determine the minimal length of expressions of an isometry in a sym...
AbstractIn a hypergroup, especially in the generalization called Hv-group, several convolutions can ...
For a real semisimple Lie group G, the description of the unitary dual remains an elusive question. ...
DOI
Add to ORKG