G-birational rigidity of the projective plane
Abstract
Given a surface S and a finite group G of automorphisms of S, consider the birational maps S S' that commute with the action of G. This leads to the notion of a G-minimal variety. A natural question arises: for a fixed group G, is there a birational G-map between two different G-minimal surfaces? If no such map exists, the surface is said to be G-birationally rigid. This paper determines the G-rigidity of the projective plane for every finite subgroup G⊂PGL3(C).
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