The GIT-equivalence for $G$-line bundles

Details The GIT-equivalence for $G$-line bundles The GIT-equivalence for $G$-line bundles

1998-11-09

arxiv.org/abs/math/9811053v1

Mathematics

Algebraic Geometry

36 pages, 4 figures

Scientific paper

Let $X$ be a projective variety with an action of a reductive group $G$. Each ample $G$-line bundle $L$ on $X$ defines an open subset $X^{\rm ss}(L)$ of semi-stable points. Following Dolgachev and Hu, define a GIT-class as the set of algebraic equivalence classes of $L'$s with fixed $X^{\rm ss}(L)$. We show that the GIT-classes are the relative interiors of rational polyhedral convex cones, which form a fan in the $G$-ample cone. We also study the corresponding variations of quotients $X^{\rm ss}(L)//G$. This sharpens results of Thaddeus and Dolgachev-Hu.

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