Add to ORKGA reflexive topological group G is called strongly reflexive if each closed sub-group and each Hausdorff quotient of the group G and of its dual group is reflexive. In this paper we establish the adequate concept of strong reflexivity for convergence groups and we prove that the product of countable many locally compact topological groups and complete metrizable nuclear groups are BB-strongly reflexive
AbstractThe Pontryagin duality theorem for locally compact abelian groups (briefly, LCA groups) has ...
AbstractA number of attempts to extend Pontryagin duality theory to categories of groups larger than...
AbstractA number of attempts to extend Pontryagin duality theory to categories of groups larger than...
A reflexive topological group G is called strongly reflexive if each closed sub-group and each Hausd...
summary:A reflexive topological group $G$ is called strongly reflexive if each closed subgroup and e...
summary:A reflexive topological group $G$ is called strongly reflexive if each closed subgroup and e...
A reflexive topological group G is called strongly reflexive if each closed subgroup and each Hausd...
summary:A reflexive topological group $G$ is called strongly reflexive if each closed subgroup and e...
A reflexive topological group G is called strongly reflexive if each closed subgroup and each Hausd...
An Abelian topological group G is strongly reflexive if every closed subgroup and every Hausdorff qu...
An Abelian topological group G is strongly reflexive if every closed subgroup and every Hausdorff qu...
An Abelian topological group G is strongly reflexive if every closed subgroup and every Hausdorff qu...
An Abelian topological group G is strongly reflexive if every closed subgroup and every Hausdorff qu...
[EN] An Abelian topological group G is strongly reflexive if every closed subgroup and every Hausdor...
The Pontryagin duality theorem for locally compact abelian groups has been the starting point for ma...
AbstractThe Pontryagin duality theorem for locally compact abelian groups (briefly, LCA groups) has ...
AbstractA number of attempts to extend Pontryagin duality theory to categories of groups larger than...
AbstractA number of attempts to extend Pontryagin duality theory to categories of groups larger than...
A reflexive topological group G is called strongly reflexive if each closed sub-group and each Hausd...
summary:A reflexive topological group $G$ is called strongly reflexive if each closed subgroup and e...
summary:A reflexive topological group $G$ is called strongly reflexive if each closed subgroup and e...
A reflexive topological group G is called strongly reflexive if each closed subgroup and each Hausd...
summary:A reflexive topological group $G$ is called strongly reflexive if each closed subgroup and e...
A reflexive topological group G is called strongly reflexive if each closed subgroup and each Hausd...
An Abelian topological group G is strongly reflexive if every closed subgroup and every Hausdorff qu...
An Abelian topological group G is strongly reflexive if every closed subgroup and every Hausdorff qu...
An Abelian topological group G is strongly reflexive if every closed subgroup and every Hausdorff qu...
An Abelian topological group G is strongly reflexive if every closed subgroup and every Hausdorff qu...
[EN] An Abelian topological group G is strongly reflexive if every closed subgroup and every Hausdor...
The Pontryagin duality theorem for locally compact abelian groups has been the starting point for ma...
AbstractThe Pontryagin duality theorem for locally compact abelian groups (briefly, LCA groups) has ...
AbstractA number of attempts to extend Pontryagin duality theory to categories of groups larger than...
AbstractA number of attempts to extend Pontryagin duality theory to categories of groups larger than...