Rigid surfaces arbitrarily close to the Bogomolov--Miyaoka--Yau line
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Publication:5056644
zbMath1503.14037arXiv1909.00435MaRDI QIDQ5056644
Giancarlo Urzúa, Matthew Stover
Publication date: 8 December 2022
Full work available at URL: https://arxiv.org/abs/1909.00435
cyclic coversDeligne-Mostow orbifoldball quotientsBogomolov-Myiaoka-Yau linerigid surfaces of general type
Uses Software
Cites Work
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- Quotients of the complex ball by discrete groups
- A compact Kähler surface of negative curvature not covered by the ball
- An \(L^ 2\) Dolbeault lemma and its applications
- The Magma algebra system. I: The user language
- On rigid compact complex surfaces and manifolds
- Bielliptic ball quotient compactifications and lattices in \(\operatorname{PU}(2,1)\) with finitely generated commutator subgroup
- Classification and arithmeticity of toroidal compactifications with \(3\overline{c}_2=\overline{c}_1^2=3\)
- Monodromy of hypergeometric functions and non-lattice integral monodromy
- Generalized Picard lattices arising from half-integral conditions
- Chern numbers of algebraic surfaces
- On the universal cover of certain exotic Kähler surfaces of negative curvature
- Cusp closing in rank one symmetric spaces
- Rigid but not infinitesimally rigid compact complex manifolds
- Chern Numbers of Algebraic Surfaces — Hirzebruch's Examples are Picard Modular Surfaces
- A minimal volume arithmetic cusped complex hyperbolic orbifold
- Volumes of Picard modular surfaces
- A Pair of Rigid Surfaces with pg= q = 2 and K2= 8 Whose Universal Cover is Not the Bidisk
- Abelian covers of algebraic varieties.
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