Key subgroups in topological groups

Abstract

We introduce two minimality properties of subgroups in topological groups. A subgroup H is a key subgroup (co-key subgroup) of a topological group G if there is no strictly coarser Hausdorff group topology on G which induces on H (resp., on the coset space G/H) the original topology. Every co-minimal subgroup is a key subgroup while the converse is not true. Every locally compact co-compact subgroup is a key subgroup (but not always co-minimal). Any relatively minimal subgroup is a co-key subgroup (but not vice versa). Extending some results concerning the generalized Heisenberg groups, we prove that the center ("corner" subgroup) of the upper unitriangular group UT(n,K), defined over a commutative topological unital ring K, is a key subgroup. Every "non-corner" 1-parameter subgroup H of UT(n,K) is a co-key subgroup. We study injectivity property of the restriction map rH T(G) T(H), \ σ σ|H and show that it is an isomorphism of sup-semilattices for every central co-minimal subgroup H, where T(G) is the semilattice of coarser Hausdorff group topologies on G.