The orbibundle Miyaoka-Yau-Sakai inequality and an effective Bogomolov-McQuillan theorem
From MaRDI portal
Publication:935907
DOI10.2977/prims/1210167331zbMath1162.14026OpenAlexW2110913888MaRDI QIDQ935907
Publication date: 12 August 2008
Published in: Publications of the Research Institute for Mathematical Sciences, Kyoto University (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.2977/prims/1210167331
Vector bundles on surfaces and higher-dimensional varieties, and their moduli (14J60) Surfaces of general type (14J29)
Related Items
On finiteness of curves with high canonical degree on a surface ⋮ Bounded negativity, Harbourne constants and transversal arrangements of curves ⋮ Negative curves on algebraic surfaces ⋮ Curves on surfaces of mixed characteristic ⋮ On the canonical degrees of curves in varieties of general type ⋮ Foliations with positive slopes and birational stability of orbifold cotangent bundles ⋮ 24 Rational curves on K3 surfaces ⋮ Finiteness of totally geodesic exceptional divisors in Hermitian locally symmetric spaces ⋮ Canonical surfaces with big cotangent bundle ⋮ Resolutions of surfaces with big cotangent bundle and $A_2$ singularities ⋮ Counting lines and conics on a surface ⋮ A remark on the intersection of plane curves ⋮ The exceptional set in Vojta’s conjecture for algebraic points of bounded degree ⋮ An explicit bound for the log-canonical degree of curves on open surfaces
Cites Work
- Unnamed Item
- Unnamed Item
- Unnamed Item
- The maximal number of quotient singularities on surfaces with given numerical invariants
- Semi-stable curves on algebraic surfaces and logarithmic pluricanonical maps
- Hypersurfaces solutions d'une équation de Pfaff analytique
- Diophantine approximations and foliations
- Zariski-decomposition and abundance
- Bounding curves in algebraic surfaces by genus and Chern numbers
- The theorem of Riemann-Roch for high multiples of an effective divisor on an algebraic surface
- Hyperbolic and Diophantine analysis
- On the ricci curvature of a compact kähler manifold and the complex monge-ampére equation, I
- Uniformity of rational points
- On the Chern numbers of surfaces of general type
