Titlebook: Geometric Invariant Theory, Holomorphic Vector Bundles and the Harder-Narasimhan Filtration; Alfonso Zamora Saiz,Ronald A. Zú?iga-Rojas Bo

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Acecainide (N-Acetylprocainamide),ctive complex algebraic group . with an algebro-geometric structure. In this chapter we present a sketch of the treatment with a variety of examples. We also review the notion of stability from the differential and symplectic points of view and explore the idea of maximal unstability.

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Geometric Invariant Theory, Holomorphic Vector Bundles and the Harder-Narasimhan Filtration978-3-030-67829-6Series ISSN 2191-8198 Series E-ISSN 2191-8201

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Introduction, variety under a reductive group. The purpose of Geometric Invariant Theory (abbreviated GIT, [., .]) is to provide a way to define a quotient of the variety by the action of the group with an algebro-geometric structure. This way, GIT results assure a good structure for the quotient, giving a posit

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