Equivariant map - Open Access .click

Russian Mathematical Surveys, 1994
The author presents an interesting generalization of the Borsuk antipodal theorem from the case of single-valued equivariant mappings to the case of multivalued equivariant mappings.
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Equivariant maps between spheres: Nagasaki’s examples

Journal of Fixed Point Theory and Applications, 2022
Let \(G\) be non trivial compact Lie group and let \(S(U)\) and \(S(V)\) be the unit spheres in non-zero orthogonal \(G\) modules \(U\) and \(V\) such that the fixed submodules \(U^{G}\) and \(V^{G}\) are trivial. \textit{I. Nagasaki} [J. Fixed Point Theory Appl. 21, No. 1, Paper No. 16, 14 p. (2019; Zbl 1407.55001) and Topology Appl.
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Free Groups and Almost Equivariant Maps

Bulletin of the London Mathematical Society, 1995
Let \(G\) be a group. If \(\Omega\) and \(\Delta\) are (right) \(G\)-sets, a function \(\phi : \Omega \to \Delta\) is called an almost \(G\)-map if, for all \(g \in G\), the set \(\{\omega \in \Omega \mid (\phi \omega) g \neq \phi (\omega g)\}\) is finite. Let \(\{*\}\) denote the \(G\)-set consisting of a single \(G\)-fixed element, \(*\). If \(G\) is
Dicks, Warren, Kropholler, Peter H.
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