The thesis is concerned with the construction and the study of moduli spaces of holomorphic Lie algebroid connections. It provides a classification of sheaves of almost polynomial filtered algebras on a smooth projective complex variety in terms of holomorphic Lie algebroids and their cohomology classes. This permits to build moduli spaces of holomorphic Lie agebroid connections via Simpson’s formalism of Lambda-modules. Furthermore, the deformation theory of such connections is studied, and the germ of their moduli spaces in the rank two case is computed when the base variety is a curve.
Lambda-modules and holomorphic Lie algebroids
Tortella, Pietro
2011
Abstract
The thesis is concerned with the construction and the study of moduli spaces of holomorphic Lie algebroid connections. It provides a classification of sheaves of almost polynomial filtered algebras on a smooth projective complex variety in terms of holomorphic Lie algebroids and their cohomology classes. This permits to build moduli spaces of holomorphic Lie agebroid connections via Simpson’s formalism of Lambda-modules. Furthermore, the deformation theory of such connections is studied, and the germ of their moduli spaces in the rank two case is computed when the base variety is a curve.File in questo prodotto:
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Utilizza questo identificativo per citare o creare un link a questo documento:
https://hdl.handle.net/20.500.14242/123280
Il codice NBN di questa tesi è
URN:NBN:IT:SISSA-123280