summary:Groups of homeomorphisms related to locally trivial bundles are studied. It is shown that these groups are perfect. Moreover if the homeomorphism isotopy group of the base is bounded then the bundle homeomorphism group of the total space is uniformly perfect
Abstract. Uniform embeddability (in a Hilbert space), introduced by Gro-mov, is a geometric property...
Abstract. Uniform embeddability (in a Hilbert space), introduced by Gromov, is a geo-metric property...
AbstractLet (X, d) be a metric space. Under which conditions is every homeomorphism from X onto X un...
summary:Groups of homeomorphisms related to locally trivial bundles are studied. It is shown that th...
Given a principal G-bundle [formula] let HG(M) be the identity component of the group of G-equivaria...
AbstractAn important theorem of Ling states that if G is any factorizable non-fixing group of homeom...
Given a principal \(G\)-bundle \(\pi:M\to B\), let \(\mathcal{H}_G(M)\) be the identity component of...
Abstract. We show that the identity component of the group of homeomor-phisms that preserve all leav...
AbstractAn important theorem of Ling states that if G is any factorizable non-fixing group of homeom...
. It is shown that the identity component of the group of all homeomorphisms of a manifold with boun...
Let G be a group of homeomorphisms on a homogeneous space X , which contains all translations on X a...
This paper surveys topologies, called admissible group topologies, of the full group of self-homeomo...
Abstract. It is shown that in some generic cases the identity component of the group of leaf preserv...
Due to the nature of product in the category of locales, the entourage uniformities in the point-fre...
AbstractWe prove that if the bilateral uniformity B of a topological group of pointwise countable ty...
Abstract. Uniform embeddability (in a Hilbert space), introduced by Gro-mov, is a geometric property...
Abstract. Uniform embeddability (in a Hilbert space), introduced by Gromov, is a geo-metric property...
AbstractLet (X, d) be a metric space. Under which conditions is every homeomorphism from X onto X un...
summary:Groups of homeomorphisms related to locally trivial bundles are studied. It is shown that th...
Given a principal G-bundle [formula] let HG(M) be the identity component of the group of G-equivaria...
AbstractAn important theorem of Ling states that if G is any factorizable non-fixing group of homeom...
Given a principal \(G\)-bundle \(\pi:M\to B\), let \(\mathcal{H}_G(M)\) be the identity component of...
Abstract. We show that the identity component of the group of homeomor-phisms that preserve all leav...
AbstractAn important theorem of Ling states that if G is any factorizable non-fixing group of homeom...
. It is shown that the identity component of the group of all homeomorphisms of a manifold with boun...
Let G be a group of homeomorphisms on a homogeneous space X , which contains all translations on X a...
This paper surveys topologies, called admissible group topologies, of the full group of self-homeomo...
Abstract. It is shown that in some generic cases the identity component of the group of leaf preserv...
Due to the nature of product in the category of locales, the entourage uniformities in the point-fre...
AbstractWe prove that if the bilateral uniformity B of a topological group of pointwise countable ty...
Abstract. Uniform embeddability (in a Hilbert space), introduced by Gro-mov, is a geometric property...
Abstract. Uniform embeddability (in a Hilbert space), introduced by Gromov, is a geo-metric property...
AbstractLet (X, d) be a metric space. Under which conditions is every homeomorphism from X onto X un...
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