On G-birational rigidity of projective spaces
Abstract
In this paper, we study finite subgroups G⊂Aut(Pn) such that Pn is G-birationally rigid. For each n≥slant 3, we prove that Aut(Pn) contains at most finitely many such subgroups up to conjugation. For n=4, we prove that P4 is G-birationally superrigid if G4(F3).
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