Special Metrics and Group Actions in Geometry [electronic resource] / / edited by Simon G. Chiossi, Anna Fino, Emilio Musso, Fabio Podestà, Luigi Vezzoni.. — 1st ed. 2017.. — X, 338 p. 12 illus., 11 illus. in color. : online resource. — (Springer INdAM Series,) 23 2281-518X ;. - Springer INdAM Series, 23 .
1 Simplicial Toric Varieties as Leaf Spaces -- 2 Homotopy Properties of Kähler Orbifolds -- 3 Notes on Transformations in Integrable Geometry -- 4 Completeness of Projective Special Kähler and Quaternionic Kähler Manifolds -- 5 Hypertoric Manifolds and Hyperkähler Moment Maps -- 6 Harmonic almost Hermitian Structures -- 7 Killing 2-Forms in Dimension 4 -- 8 Twistors, Hyper-Kähler Manifolds, and Complex Moduli -- 9 Explicit Global Symplectic Coordinates on Kähler Manifolds -- 10 Instantons and Special Geometry -- 11 Hermitian Metrics on Compact Complex Manifolds and their Deformation Limits -- 12 On The Cohomology of Some Exceptional Symmetric Spaces -- 13 Manifolds with Exceptional Holonomy.
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Анотація: The volume is a follow-up to the INdAM meeting “Special metrics and quaternionic geometry” held in Rome in November 2015. It offers a panoramic view of a selection of cutting-edge topics in differential geometry, including 4-manifolds, quaternionic and octonionic geometry, twistor spaces, harmonic maps, spinors, complex and conformal geometry, homogeneous spaces and nilmanifolds, special geometries in dimensions 5–8, gauge theory, symplectic and toric manifolds, exceptional holonomy and integrable systems. The workshop was held in honor of Simon Salamon, a leading international scholar at the forefront of academic research who has made significant contributions to all these subjects. The articles published here represent a compelling testimony to Salamon’s profound and longstanding impact on the mathematical community. Target readership includes graduate students and researchers working in Riemannian and complex geometry, Lie theory and mathematical physics.
9783319675190
10.1007/978-3-319-67519-0 doi
Topological groups. Lie groups. Differential geometry. Global analysis (Mathematics). Manifolds (Mathematics). Algebraic geometry. Topological Groups, Lie Groups. Differential Geometry. Global Analysis and Analysis on Manifolds. Algebraic Geometry.