AbstractSufficient conditions are given for the union of two Hilbert cube (manifolds) intersecting in a Hilbert cube (manifold) to be a Hilbert cube (manifold). The corollaries include a non-stabilized mapping cylinder theorem for embeddings between Hilbert cube manifolds and a sum theorem for Keller cubes
AbstractThis exposition focuses not on manifolds modelled on Hilbert space but rather modelled on s=...
AbstractWe make the following remarks. Every boundary set in the Hilbert cube can be reimbedded as a...
AbstractIt is shown that for each closed subset X of codimension at least three in the Hilbert cube ...
AbstractSufficient conditions are given for the union of two Hilbert cube (manifolds) intersecting i...
AbstractIt is shown that the class of Hilbert cube factors is closed under the operation of taking m...
AbstractIn this paper we give the hard technical details for the author's recent proof that any cell...
AbstractA concept of relative or reduced mapping cylinders is introduced, and it is shown that if ƒ ...
AbstractWe give a characterization of manifolds modeled on R∞= dir lim or RnQ∞=dir lim Qn, where Q i...
AbstractWe study properties of those σZ-sets in the Hilbert cube whose complements are homeomorphic ...
AbstractThe purpose of this note is to illustrate in the simplest possible terms how a function spac...
AbstractGiven subset E of natural numbers FS(E) is defined as the collection of all sums of elements...
AbstractLet X be a compact metric space with no isolated points. Then we may embed X as a subset of ...
Graduation date: 2008Cellular sets in the Hilbert cube are the intersection of nested sequences of n...
International audienceWe prove that the properties of acting metrically properly on some space with ...
AbstractBased upon recent results characterizing Q-manifolds, this paper sets forth an explicit meth...
AbstractThis exposition focuses not on manifolds modelled on Hilbert space but rather modelled on s=...
AbstractWe make the following remarks. Every boundary set in the Hilbert cube can be reimbedded as a...
AbstractIt is shown that for each closed subset X of codimension at least three in the Hilbert cube ...
AbstractSufficient conditions are given for the union of two Hilbert cube (manifolds) intersecting i...
AbstractIt is shown that the class of Hilbert cube factors is closed under the operation of taking m...
AbstractIn this paper we give the hard technical details for the author's recent proof that any cell...
AbstractA concept of relative or reduced mapping cylinders is introduced, and it is shown that if ƒ ...
AbstractWe give a characterization of manifolds modeled on R∞= dir lim or RnQ∞=dir lim Qn, where Q i...
AbstractWe study properties of those σZ-sets in the Hilbert cube whose complements are homeomorphic ...
AbstractThe purpose of this note is to illustrate in the simplest possible terms how a function spac...
AbstractGiven subset E of natural numbers FS(E) is defined as the collection of all sums of elements...
AbstractLet X be a compact metric space with no isolated points. Then we may embed X as a subset of ...
Graduation date: 2008Cellular sets in the Hilbert cube are the intersection of nested sequences of n...
International audienceWe prove that the properties of acting metrically properly on some space with ...
AbstractBased upon recent results characterizing Q-manifolds, this paper sets forth an explicit meth...
AbstractThis exposition focuses not on manifolds modelled on Hilbert space but rather modelled on s=...
AbstractWe make the following remarks. Every boundary set in the Hilbert cube can be reimbedded as a...
AbstractIt is shown that for each closed subset X of codimension at least three in the Hilbert cube ...
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