Fixed point sets of smooth G-manifolds pseudo-equivalent to a G-template
Abstract
For a finite group G not of prime power order, Oliver (1996) has answered the question which manifolds occur as the fixed point sets of smooth actions of G on disks (resp., Euclidean spaces). We extend Oliver's result to compact (resp., open) smooth G-manifolds M pseudo-equivalent to Y, a finite Z-acyclic G-CW complex such that the fixed point set YG is non-empty, connected, and (YG) 1 nG, where nG is the Oliver number of G. We prove that the answer to the question above does not depend on the choice of Y. For a finite connected G-CW complex Y such that YG is non-empty and connected, called a G-template, we prove that a compact stably parallelizable manifold F occurs as the fixed point set MG of a compact smooth G-manifold M pseudo-equivalent to Y, if and only if (F) (YG) nG. Moreover, there exists a compact smooth fixed point free G-manifold pseudo-equivalent to a G-template Y, if and only if (YG) 0 nG. In particular, similarly as for actions on disks, there exists a compact smooth fixed point free G-manifold pseudo-equivalent to the real projective space R P2n for an integer n ≥ 1, if and only if G is an Oliver group. Finally, we prove that each finite Oliver group G has a smooth fixed point free action on R P2n itself for some integer n ≥ 1.
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