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

First Page		Document Content
Date: 2018-07-25 13:17:42 Geometry Algebraic geometry Algebraic surfaces Space Birational geometry Singularity theory Projective geometry Enriques surface Rational surface Complex projective plane Fake projective plane EnriquesKodaira classification		Proc. Int. Cong. of Math. – 2018 Rio de Janeiro, Vol–714) ALGEBRAIC SURFACES WITH MINIMAL BETTI NUMBERS JongHae Keum (금종해) Add to Reading List Source URL: eta.impa.br Download Document from Source Website File Size: 407,49 KB Share Document on Facebook

	The second closed geodesic on the complex projective plane ∗ Hans-Bert Rademacher Abstract We show the existence of at least two geometrically distinct closed DocID: 1pskv - View Document
	SU(2)-DONALDSON INVARIANTS OF THE COMPLEX PROJECTIVE PLANE MICHAEL GRIFFIN, ANDREAS MALMENDIER AND KEN ONO Abstract. There are two families of Donaldson invariants for the complex projective plane, corresponding to the S DocID: 1mAFb - View Document
	Complex Analysis Harold V. McIntosh Departamento de Aplicaci´on de Microcomputadoras, Instituto de Ciencias, Universidad Aut´onoma de Puebla, Apartado postal 461, 72000 Puebla, Puebla, M´exico. April 5, 2001 DocID: 11gOj - View Document
	Conformal Mappings from the Upper Half Plane to Fundamental Domains on the Hyperbolic Plane DocID: 4gCg - View Document
	The Geometry of Möbius Transformations John Olsen DocID: 4cAB - View Document