Abstract
For a finite group
$G$
of not prime power order, Oliver showed that the obstruction for a finite CW-complex
$F$
to be the fixed point set of a contractible finite
$G$
-CW-complex is determined by the Euler characteristic
$\chi (F)$
. (He also has similar results for compact Lie group actions.) We show that the analogous problem for
$F$
to be the fixed point set of a finite
$G$
-CW-complex of some given homotopy type is still determined by the Euler characteristic. Using trace maps on
$K_0$
[2, 7, 18], we also see that there are interesting roles for the fundamental group and the component structure of the fixed point set.
Publisher
Cambridge University Press (CUP)