2001 Volume 37 Issue 2 Pages 191-220
For a finite group G and a G-map f : X → Y of degree one, where X and Y are compact, connected, oriented, 3-dimensional, smooth G-manifolds, we give an obstruction element σ(f) in a K-theoretic group called the Bak group, with the property: σ(f)=0 guarantees that one can perform G-surgery on X so as to convert f to a homology equivalence f' : X' → Y. Using this obstruction theory, we determine the G-homeomorphism type of the singular set of a smooth action of A5 on a 3-dimensional homology sphere having exactly one fixed point, where A5 is the alternating group on five letters.
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