Finite group actions, rational fixed points and weak N\'eron models
Abstract
If G is a finite -group acting on an affine space An over a finite field K of cardinality prime to , Serre has shown that there exists a rational fixed point. We generalize this to the case where K is a henselian discretely valued field of characteristic zero with algebraically closed residue field and with residue characteristic different from . We also treat the case where the residue field is finite of cardinality q such that divides q-1. To this aim, we study group actions on weak N\'eron models.
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