Principles of Locally Conformally Kaehler Geometry
portes grátis
Principles of Locally Conformally Kaehler Geometry
Ornea, Liviu; Verbitsky, Misha
Birkhauser Verlag AG
05/2024
736
Dura
9783031581199
15 a 20 dias
Descrição não disponível.
Introduction.- Part I: Lectures in locally conformally Kaehler geometry.- Kaehler manifolds.- Connections in vector bundles and the Froebenius theorem.- Locally conformally Kahler manifolds.- Hodge theory on complex manifolds and Vaisman's theorem.- Holomorphic vector bundles.- CR, Contact and Sasakian manifolds.- Vaisman manifolds.- The structure of compact Vaisman manifolds.- Orbifolds.- Quasi-regular foliations.- Regular and quasi-regular Vaisman manifolds.- LCK manifolds with potential.- Embedding LCK manifolds with potential in Hopf manifolds.- Logarithms and algebraic cones.- Pseudoconvex shells and LCK metrics on Hopf manifolds.- Embedding theorem for Vaisman manifolds.- Non-linear Hopf manifolds.- Morse-Novikov and Bott-Chern cohomology of LCK manifolds.- Existence of positive potentials.- Holomorphic S^1 actions on LCK manifolds.- Sasakian submanifolds in algebraic cones.- Oeljeklaus-Toma manifolds.- Appendices.- Part II: Advanced LCK geometry.- Non-Kaehler elliptic surfaces.- Kodaira classification for non-Kaehler complex surfaces.- Cohomology of holomorphic bundles on Hopf manifolds.- Mall bundles and flat connections on Hopf manifolds.- Kuranishi and Teichmueller spaces for LCK manifolds with potential.- The set of Lee classes on LCK manifolds with potential.- Harmonic forms on Sasakian and Vaisman manifolds.- Dolbeault cohomology of LCK manifolds with potential.- Calabi-Yau theorem for Vaisman manifolds.- Holomorphic tensor fields on LCK manifolds with potential.- Part III: Topics in locally conformally Kaehler geometry.- Twisted Hamiltonian actions and LCK reduction.- Elliptic curves on Vaisman manifolds.- Submersions and bimeromorphic maps of LCK manifolds.- Bott-Chern cohomology of LCK manifolds with potential.- Hopf surfaces in LCK manifolds with potential.- Riemannian geometry of LCK manifolds.- Einstein-Weyl manifolds and the Futaki invariant.- LCK structures on homogeneous manifolds.- LCK structures on nilmanifolds and solvmanifolds.- Explicit LCK metrics on Inoue surfaces.- More on Oeljeklaus-Toma manifolds.- Locally conformally parallel and non-parallel structures.- Open questions.
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Locally conformally Kaehler manifold;Kaehler geometry;Kaehler metric;Stein space;Vaisman manifold;Gauduchon metric;Ample bundle
Introduction.- Part I: Lectures in locally conformally Kaehler geometry.- Kaehler manifolds.- Connections in vector bundles and the Froebenius theorem.- Locally conformally Kahler manifolds.- Hodge theory on complex manifolds and Vaisman's theorem.- Holomorphic vector bundles.- CR, Contact and Sasakian manifolds.- Vaisman manifolds.- The structure of compact Vaisman manifolds.- Orbifolds.- Quasi-regular foliations.- Regular and quasi-regular Vaisman manifolds.- LCK manifolds with potential.- Embedding LCK manifolds with potential in Hopf manifolds.- Logarithms and algebraic cones.- Pseudoconvex shells and LCK metrics on Hopf manifolds.- Embedding theorem for Vaisman manifolds.- Non-linear Hopf manifolds.- Morse-Novikov and Bott-Chern cohomology of LCK manifolds.- Existence of positive potentials.- Holomorphic S^1 actions on LCK manifolds.- Sasakian submanifolds in algebraic cones.- Oeljeklaus-Toma manifolds.- Appendices.- Part II: Advanced LCK geometry.- Non-Kaehler elliptic surfaces.- Kodaira classification for non-Kaehler complex surfaces.- Cohomology of holomorphic bundles on Hopf manifolds.- Mall bundles and flat connections on Hopf manifolds.- Kuranishi and Teichmueller spaces for LCK manifolds with potential.- The set of Lee classes on LCK manifolds with potential.- Harmonic forms on Sasakian and Vaisman manifolds.- Dolbeault cohomology of LCK manifolds with potential.- Calabi-Yau theorem for Vaisman manifolds.- Holomorphic tensor fields on LCK manifolds with potential.- Part III: Topics in locally conformally Kaehler geometry.- Twisted Hamiltonian actions and LCK reduction.- Elliptic curves on Vaisman manifolds.- Submersions and bimeromorphic maps of LCK manifolds.- Bott-Chern cohomology of LCK manifolds with potential.- Hopf surfaces in LCK manifolds with potential.- Riemannian geometry of LCK manifolds.- Einstein-Weyl manifolds and the Futaki invariant.- LCK structures on homogeneous manifolds.- LCK structures on nilmanifolds and solvmanifolds.- Explicit LCK metrics on Inoue surfaces.- More on Oeljeklaus-Toma manifolds.- Locally conformally parallel and non-parallel structures.- Open questions.
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