
handle: 10203/73847
Summary: Let \(G\) be a topological group and \(X\) a \(G\)-space. For a given nonequivariant vector bundle over \(X\) there does not always exist a \(G\)-equivariant vector bundle structure. In this paper we find some sufficient conditions for nonequivariant real line bundles to have \(G\)-equivariant vector bundle structures.
Topological transformation groups, Stiefel-Whitney class, Equivariant fiber spaces and bundles in algebraic topology
Topological transformation groups, Stiefel-Whitney class, Equivariant fiber spaces and bundles in algebraic topology
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