Add to ORKG1.1. Let G be a noncompact connected real semi-simple Lie group with trivial center and with no nontrivial compact connected normal subgroups, and g be its Lie algebra. The group Aut(G) (=Aut(g)) of automorphisms of G is a Lie group with finitely many connected components, and G is its identity component. We wil
Recalling that a topological group G is said to be almost connected if the quotient group G=G0 is co...
We prove that the existence of a homogeneous invariant of degree n for arepresentation of a semi-sim...
AbstractLet G be a connected solvable Lie group, π a normal factor representation of G and ψ a nonze...
1.1. Let G be a noncompact connected real semi-simple Lie group with trivial center and with no nont...
The quotient of a hermitian symmetric space of non-compact type by a torsionfree cocompact arithmeti...
AbstractThe class [S] of locally compact groups G is considered, for which the algebra L1(G) is symm...
Leptin H, Poguntke D. Symmetry and nonsymmetry for locally compact groups. Journal of functional ana...
1. The trace formula of Selberg reduces the problem of calculating the dimension of a space of autom...
For a locally compact group G, let A(G) denote its Fourier algebra, and let M_0A(G) denote the space...
Poguntke D. Symmetry and nonsymmetry for a class of exponential Lie groups. Journal für die reine un...
Let $M$ be a simply connected pseudo-Riemannian homogeneous space of finite volume with isometry gro...
For a connected, noncompact simple matrix Lie group G so that a maximal compact subgroup K has a thr...
Abstract. Let G0 be a simply connected non-compact real simple Lie group with maximal compact subgro...
A locally compact group G is called a Tortrat group if for any probability measure λ on G which...
Let FG be the group algebra of a group G without 2-elements over a field F of characteristic p ≠ 2 e...
Recalling that a topological group G is said to be almost connected if the quotient group G=G0 is co...
We prove that the existence of a homogeneous invariant of degree n for arepresentation of a semi-sim...
AbstractLet G be a connected solvable Lie group, π a normal factor representation of G and ψ a nonze...
1.1. Let G be a noncompact connected real semi-simple Lie group with trivial center and with no nont...
The quotient of a hermitian symmetric space of non-compact type by a torsionfree cocompact arithmeti...
AbstractThe class [S] of locally compact groups G is considered, for which the algebra L1(G) is symm...
Leptin H, Poguntke D. Symmetry and nonsymmetry for locally compact groups. Journal of functional ana...
1. The trace formula of Selberg reduces the problem of calculating the dimension of a space of autom...
For a locally compact group G, let A(G) denote its Fourier algebra, and let M_0A(G) denote the space...
Poguntke D. Symmetry and nonsymmetry for a class of exponential Lie groups. Journal für die reine un...
Let $M$ be a simply connected pseudo-Riemannian homogeneous space of finite volume with isometry gro...
For a connected, noncompact simple matrix Lie group G so that a maximal compact subgroup K has a thr...
Abstract. Let G0 be a simply connected non-compact real simple Lie group with maximal compact subgro...
A locally compact group G is called a Tortrat group if for any probability measure λ on G which...
Let FG be the group algebra of a group G without 2-elements over a field F of characteristic p ≠ 2 e...
Recalling that a topological group G is said to be almost connected if the quotient group G=G0 is co...
We prove that the existence of a homogeneous invariant of degree n for arepresentation of a semi-sim...
AbstractLet G be a connected solvable Lie group, π a normal factor representation of G and ψ a nonze...