Dual topologies on non-abelian groups
From MaRDI portal
Publication:429327
DOI10.1016/j.topol.2011.08.031zbMath1246.22008arXiv1011.3530OpenAlexW3151129276MaRDI QIDQ429327
Salvador Hernández, María Vicenta Ferrer González
Publication date: 19 June 2012
Published in: Topology and its Applications (Search for Journal in Brave)
Full work available at URL: https://arxiv.org/abs/1011.3530
totally bounded groupcompact group\(\kappa \)-narrow group\(\kappa \)-narrow uniform spacedetermined groupdual topological groupLindelöf numbermaximally almost periodic groupTannaka-Krein duality
Structure of general topological groups (22A05) Duality theorems for locally compact groups (22D35) Character groups and dual objects (43A40)
Related Items
Contributions to the Bohr topology by W.W. Comfort ⋮ Some cases of preservation of the Pontryagin dual by taking dense subgroups ⋮ Locally quasi-convex convergence groups ⋮ Precompact groups and property (T) ⋮ Equicontinuity criteria for metric-valued sets of continuous functions
Cites Work
- Some cases of preservation of the Pontryagin dual by taking dense subgroups
- Some new results on the Chu duality of discrete groups
- Topological groups and related structures
- Uncountable products of determined groups need not be determined
- Quasi-convex density and determining subgroups of compact Abelian groups
- Zwei Klassen lokalkompakter maximal fastperiodischer Gruppen
- Chu-Dualität und zwei Klassen maximal fastperiodischer Gruppen
- Pontryagin duality for metrizable groups
- On homomorphism spaces of metrizable groups
- Interpolation sets and the Bohr topology of locally compact groups
- Dualität lokalkompakter Gruppen
- The Dual Group of a Dense Subgroup
- Radon‐Nikodým compact spaces and fragmentability
- Almost Periodic Functions in a Group. I
- Convergent Sequences in Discrete Groups
- Topologies induced by groups of characters
- Compactification and Duality of Topological Groups
- A Characterization of Unitary Duality
- A Universal Property of the Takahashi Quasi-Dual
- The structure of compact groups. A primer for the student -- a handbook for the expert
- Unnamed Item
- Unnamed Item
- Unnamed Item
- Unnamed Item
- Unnamed Item
- Unnamed Item
- Unnamed Item
- Unnamed Item
- Unnamed Item
- Unnamed Item
