AbstractLet G be a topological group and let [G,G] be the group of homotopy classes of maps from G into G. For a large class of simple Lie groups, we prove that the group [G,G] is non-abelian. For certain Lie groups we show that nil[G,G]⩾3
AbstractFor connected Lie groups G and H the calculation of the mapping space map(BG, BH) can be red...
Let G be a noncompact semi-simple Lie group and S subset of G a Lie semigroup with nonempty interior...
AbstractWe discuss the ways in which a Lie group G can act as a group of transformations of a topolo...
AbstractLet G be a topological group and let [G,G] be the group of homotopy classes of maps from G i...
The authors solve the following problem: for which connected Lie groups is the group of homotopy cla...
The set of homotopy classes of self maps of a compact, connected Lie group G is a group by the point...
In an earlier paper [JMO], we gave a complete description of all homotopy classes of self maps of th...
AbstractThe set of homotopy classes of self maps of a compact, connected Lie group G is a group by t...
For a connected Lie group G and a based space X, the set [X,G] of homotopy classes of based maps fro...
Abstract. We demonstrate that, for any n> 0, there exists a compact con-nected Lie group G such t...
Abstract. In an earlier paper, we developed general techniques which can be used to study the set of...
The basic problem of homotopy theory is to classify spaces and maps between spaces, up to homotopy, ...
Self homotopy equivalences of classifying spaces of compact connected Lie groups by Stefan Ja ckowsk...
AbstractFor a connected Lie group G, the homotopy set [G,G] inherits the group structure by the poin...
AbstractThe self-homotopy group of a topological group G is the set of homotopy classes of self-maps...
AbstractFor connected Lie groups G and H the calculation of the mapping space map(BG, BH) can be red...
Let G be a noncompact semi-simple Lie group and S subset of G a Lie semigroup with nonempty interior...
AbstractWe discuss the ways in which a Lie group G can act as a group of transformations of a topolo...
AbstractLet G be a topological group and let [G,G] be the group of homotopy classes of maps from G i...
The authors solve the following problem: for which connected Lie groups is the group of homotopy cla...
The set of homotopy classes of self maps of a compact, connected Lie group G is a group by the point...
In an earlier paper [JMO], we gave a complete description of all homotopy classes of self maps of th...
AbstractThe set of homotopy classes of self maps of a compact, connected Lie group G is a group by t...
For a connected Lie group G and a based space X, the set [X,G] of homotopy classes of based maps fro...
Abstract. We demonstrate that, for any n> 0, there exists a compact con-nected Lie group G such t...
Abstract. In an earlier paper, we developed general techniques which can be used to study the set of...
The basic problem of homotopy theory is to classify spaces and maps between spaces, up to homotopy, ...
Self homotopy equivalences of classifying spaces of compact connected Lie groups by Stefan Ja ckowsk...
AbstractFor a connected Lie group G, the homotopy set [G,G] inherits the group structure by the poin...
AbstractThe self-homotopy group of a topological group G is the set of homotopy classes of self-maps...
AbstractFor connected Lie groups G and H the calculation of the mapping space map(BG, BH) can be red...
Let G be a noncompact semi-simple Lie group and S subset of G a Lie semigroup with nonempty interior...
AbstractWe discuss the ways in which a Lie group G can act as a group of transformations of a topolo...
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