Multivalued sections and self-maps of sphere bundles
Abstract
Let G be a finite group and V a finite dimensional (non-zero) orthogonal G-module such that, for each prime p dividing the order of G, the subspace of V fixed by a Sylow p-subgroup of G is non-zero and, if the dimension of V is odd, has dimension greater than 1. Using ideas of Avvakumov, Karasev, Kudrya and Skopenkov and work of Noakes on self-maps of sphere bundles, we show that, for any principal G-bundle P X over a compact ENR X, there exists a G-map from P to the unit sphere S(V) in V.
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