AbstractThe equivariant movability of topological spaces with an action of a given topological group G is considered. In particular, the equivariant movability of topological groups is studied. It is proved that a second countable group G is Lie if and only if it is equivariantly movable
Abstract. We present the computations of the secondary obstruction groups for the first stem of stab...
We present the computations of the secondary obstruction groups for the first stem of stable equiv...
AbstractIt was asked by Itzkowitz in 1976 whether or not the equality of left and right uniformities...
AbstractThe equivariant movability of topological spaces with an action of a given topological group...
In this article some questions of equivariant movability, connected with the substitution of the act...
In this article some questions of equivariant movability, connected with the substitution of the act...
Abstract. We study uniform and coarse embeddings between Banach spaces and topological groups. A par...
In this paper the some questions of equivariant movability connected with substitution of acting gro...
We extend Følner’s amenability criterion to the realm of general topological groups. Building on thi...
A countable group G is called topologically amenable if there exist a compact Hausdorff space X on w...
We show that the invariant topological complexity defines a new numerical invariant for orbifolds. ...
We show that the invariant topological complexity defines a new numerical invariant for orbifolds. ...
ABSTRACT. For G a finite group, we prove in dimension 2 that there is a monoidal equivalenc
summary:An important consequence of a result of Katětov and Morita states that every metrizable spac...
Abstract. The notion of movability for metrizable compacta was in-troduced by K.Borsuk [1]. In this ...
Abstract. We present the computations of the secondary obstruction groups for the first stem of stab...
We present the computations of the secondary obstruction groups for the first stem of stable equiv...
AbstractIt was asked by Itzkowitz in 1976 whether or not the equality of left and right uniformities...
AbstractThe equivariant movability of topological spaces with an action of a given topological group...
In this article some questions of equivariant movability, connected with the substitution of the act...
In this article some questions of equivariant movability, connected with the substitution of the act...
Abstract. We study uniform and coarse embeddings between Banach spaces and topological groups. A par...
In this paper the some questions of equivariant movability connected with substitution of acting gro...
We extend Følner’s amenability criterion to the realm of general topological groups. Building on thi...
A countable group G is called topologically amenable if there exist a compact Hausdorff space X on w...
We show that the invariant topological complexity defines a new numerical invariant for orbifolds. ...
We show that the invariant topological complexity defines a new numerical invariant for orbifolds. ...
ABSTRACT. For G a finite group, we prove in dimension 2 that there is a monoidal equivalenc
summary:An important consequence of a result of Katětov and Morita states that every metrizable spac...
Abstract. The notion of movability for metrizable compacta was in-troduced by K.Borsuk [1]. In this ...
Abstract. We present the computations of the secondary obstruction groups for the first stem of stab...
We present the computations of the secondary obstruction groups for the first stem of stable equiv...
AbstractIt was asked by Itzkowitz in 1976 whether or not the equality of left and right uniformities...
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