Espaces abstraits de morphismes et mutations II
Abstract
Let E,F be algebraic vector bundles on a projective algebraic variety. Let G=Aut(E)XAut(F), acting on W=Hom(E,F). In this paper new methods of construction of algebraic quotients of open G-invariant subsets of W are studied. This is done by associating to W a new space of morphisms W'=Hom(E',F') (with group G'=Aut(E')XAut(F')) in such a way that there is a natural bijection between the set of G-orbits of an open subset of W and the set of G'-orbits of an open subset of W'. We can then apply already known construction methods to G'-invariant open subsets of W' and deduce with the correspondance new quotients of open G-invariant subsets of W. This is a new version and a continuation of an older paper.
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