Automorphisms of Rational Surfaces with Positive Entropy J ULIE D E´ SERTI & J ULIEN G RIVAUX A BSTRACT. A complex compact surface which carries a minimal automorphism of positive topological entropy has been proved by

Source URL: jgrivaux.perso.math.cnrs.fr

• Algebra
• Geometry
• Abstract algebra
• Birational geometry
• Algebraic geometry
• Blowing up
• Rational mapping
• Algebraic surface
• Resolution of singularities
• Cremona group
• Ample line bundle
• Divisor

Proc. Int. Cong. of Math. – 2018 Rio de Janeiro, Vol–714) ALGEBRAIC SURFACES WITH MINIMAL BETTI NUMBERS JongHae Keum (금종해)

Source URL: eta.impa.br

• Geometry
• Algebraic geometry
• Algebraic surfaces
• Space
• Birational geometry
• Singularity theory
• Projective geometry
• Enriques surface
• Rational surface
• Complex projective plane
• Fake projective plane
• EnriquesKodaira classification

MINIMAL AND CONSTANT MEAN CURVATURE SURFACES IN THE THREE-SPHERE: BRENDLE’S PROOF OF THE LAWSON CONJECTURE BEN ANDREWS Minimal surfaces (surfaces of least area) and related objects such as constant mean curvature surfa

Source URL: www.math.sci.hokudai.ac.jp

arXiv:1601.07588v1 [math.DG] 27 JanFREE BOUNDARY MINIMAL SURFACES IN THE UNIT BALL WITH LOW COHOMOGENEITY BRIAN FREIDIN, MAMIKON GULIAN AND PETER MCGRATH

Source URL: arxiv.org

SHARP AREA BOUNDS FOR FREE BOUNDARY MINIMAL SURFACES IN CONFORMALLY EUCLIDEAN BALLS arXiv:1510.01988v4 [math.DG] 2 JulBrian Freidin & Peter McGrath

Source URL: arxiv.org

STABLE EMBEDDED MINIMAL SURFACES BOUNDED BY A STRAIGHT LINE ´ JOAQU´IN PEREZ Abstract. We prove that if M ⊂ R3 is a properly embedded oriented stable minimal surface whose boundary is a straight line and the area of

Source URL: www.ugr.es

The space of complete minimal surfaces with finite total curvature as lagrangian submanifold Joaqu´ın P´erez∗ Antonio Ros∗

Source URL: www.ugr.es

A rigidity theorem for periodic minimal surfaces Joaqu´ın P´erez∗ September 9, 1997 Abstract.- We prove that the Helicoid can be characterized as the only properly embedded non rigid minimal surface in R3 that is in

Source URL: www.ugr.es

The geometry of minimal surfaces of finite genus II; nonexistence of one limit end examples. William H. Meeks III∗, Joaqu´ın P´erez† and Antonio Ros† March 29, 2004 Abstract

Source URL: www.ugr.es

Parabolicity and Gauss map of minimal surfaces Joaqu´ın P´erez∗ Francisco J. L´opez October 25, 2001

Source URL: www.ugr.es