Action de groupe sur la compactification hybride
Abstract
Let X be an algebraic variety over C and G be an algebraic group acting on X whose action is closed. J. Poineau defined a compactification X of X(C) by using hybrid Berkovich spaces. We will focus on the extension of the action of G on this compactification by characterising the set U ⊂ X where the action is well defined. We will also show that the quotient of U by the action of G is homeomorphic to (X/G), the compactification of (X/G)(C). We then apply these results to X = Ratd, the space of rational maps and G = SL2. It gives the results of C. Favre-C. Gong in a more general setting. Furthermore, we get a compactification of Md = Ratd/SL2 where the boundary is made of orbits of non-archimedean rational maps. The results still holds if C is replaced by k a non-trivially valued field and complex analytic spaces by Berkovich spaces over k or if X is the set of stable points of a k-variety defined in the sense of GIT.
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