MR References A. Beauville, Complex Algebraic Surfaces. Cambridge Univ. Press, MR 85a J. Wall, On the classification of cubic surfaces. MR 80f A. Tsfasman, Arithmetic on singular Del Pezzo surfaces. MR 89f M. MR 82d I. Harris, Algebraic geometry. MR 97e R. Hartshorne, Algebraic Geometry. Springer-Verlag, New York-Heidelberg, MR T. Hosoh, Automorphism groups of cubic surfaces. MR 99d T. Hosoh, Automorphism groups of quartic del Pezzo surfaces. MR 97i S. Iitaka, Algebraic Geometry.
Thank you for submitting a report! Submitting a report will send us an email through our customer support system. Submit report Close. Recommended Articles Loading References An open string analogue of Viterbo functoriality. Le groupe de monodromie du deploiement des singularites isolees de courbes planes I.
Real deformations and the topology of complex plane singularities. Singularities of smooth mappings. A classification of the unimodal critical points of functions. Critical points of smooth functions, and their normal forms. Mirror symmetry and T-duality in the complement of an anticanonical divisor. Mirror symmetry for weighted projective planes and their noncommutative deformations. Representations of associative algebras and coherent sheaves.
Homological mirror symmetry for A n -resolutions as a T-duality. Singularities and Topology of Hypersurfaces. Fifteen characterizations of rational double points and simple critical points. Mirror symmetry between orbifold curves and cusp singularities with group action. Symplectic mapping class groups of some Stein and rational surfaces.
Homological mirror symmetry for Brieskorn-Pham singularities. Intersection matrices for certain singularities. Dynkin diagrams for unimodal singularities. Dynkin diagrams of the singularities of functions of two variables. Stability conditions on An-singularities. Complexifications of Morse functions and the directed Donaldson—Fukaya category.
Spin structures and quadratic forms on surfaces. Dehn twists and free subgroups of the symplectic mapping class group. View 3 excerpts, cites background. Arithmetic geometry of toric varieties. We show that the height of a toric variety with respect to a toric metrized line bundle can be expressed as the integral over a polytope of a certain adelic family of concave functions. To state and … Expand. Toric quotients and flips. As my contribution to these proceedings, I will discuss the geometric invariant theory quotients of toric varieties.
Specifically, I will show that quotients of the same problem with respect to … Expand. The goal is to explain the relevance of spaces of arcs to … Expand. Highly Influenced. View 1 excerpt, cites background. Ju n 19 95 Residues in Toric Varieties June 22 , Introduction Toric residues provide a tool for the study of certain homogeneous ideals of the homogeneous coordinate ring of a toric variety—such as those appearing in the description of the Hodge … Expand. Introduction to Toric Varieties.
Toric varieties are algebraic varieties arising from elementary geometric and combinatorial objects such as convex polytopes in Euclidean space with vertices on lattice points.
Since many algebraic … Expand. Highly Influential. View 10 excerpts, references background. Topological methods in algebraic geometry. Introduction Chapter 1: Preparatory material 1.
Multiplicative sequences 2. Sheaves 3. Fibre bundles 4. Characteristic classes Chapter 2: The cobordism ring 5. Pontrjagin numbers 6. The ring … Expand.
0コメント