06282nam 2201861 a 450 991077822290332120200520144314.01-282-15774-497866121577451-4008-2780-910.1515/9781400827800(CKB)1000000000788440(EBL)457845(OCoLC)438732324(SSID)ssj0000190877(PQKBManifestationID)11937129(PQKBTitleCode)TC0000190877(PQKBWorkID)10181037(PQKB)10884987(DE-B1597)446562(OCoLC)979581490(DE-B1597)9781400827800(Au-PeEL)EBL457845(CaPaEBR)ebr10312431(CaONFJC)MIL215774(MiAaPQ)EBC457845(PPN)170237761(EXLCZ)99100000000078844020060803d2007 uy 0engur|n|---|||||txtccrLectures on resolution of singularities[electronic resource] /János KollárCourse BookPrinceton, N.J. Princeton University Press20071 online resource (215 p.)Annals of mathematics studies ;166Description based upon print version of record.0-691-12922-3 0-691-12923-1 Includes bibliographical references (p. 197-202) and index. Frontmatter -- Contents -- Introduction -- Chapter 1. Resolution for Curves -- Chapter 2. Resolution for Surfaces -- Chapter 3. Strong Resolution in Characteristic Zero -- Bibliography -- IndexResolution of singularities is a powerful and frequently used tool in algebraic geometry. In this book, János Kollár provides a comprehensive treatment of the characteristic 0 case. He describes more than a dozen proofs for curves, many based on the original papers of Newton, Riemann, and Noether. Kollár goes back to the original sources and presents them in a modern context. He addresses three methods for surfaces, and gives a self-contained and entirely elementary proof of a strong and functorial resolution in all dimensions. Based on a series of lectures at Princeton University and written in an informal yet lucid style, this book is aimed at readers who are interested in both the historical roots of the modern methods and in a simple and transparent proof of this important theorem.Annals of mathematics studies ;no. 166.Singularities (Mathematics)Adjunction formula.Algebraic closure.Algebraic geometry.Algebraic space.Algebraic surface.Algebraic variety.Approximation.Asymptotic analysis.Automorphism.Bernhard Riemann.Big O notation.Birational geometry.C0.Canonical singularity.Codimension.Cohomology.Commutative algebra.Complex analysis.Complex manifold.Computability.Continuous function.Coordinate system.Diagram (category theory).Differential geometry of surfaces.Dimension.Divisor.Du Val singularity.Dual graph.Embedding.Equation.Equivalence relation.Euclidean algorithm.Factorization.Functor.General position.Generic point.Geometric genus.Geometry.Hyperplane.Hypersurface.Integral domain.Intersection (set theory).Intersection number (graph theory).Intersection theory.Irreducible component.Isolated singularity.Laurent series.Line bundle.Linear space (geometry).Linear subspace.Mathematical induction.Mathematics.Maximal ideal.Morphism.Newton polygon.Noetherian ring.Noetherian.Open problem.Open set.P-adic number.Pairwise.Parametric equation.Partial derivative.Plane curve.Polynomial.Power series.Principal ideal.Principalization (algebra).Projective space.Projective variety.Proper morphism.Puiseux series.Quasi-projective variety.Rational function.Regular local ring.Resolution of singularities.Riemann surface.Ring theory.Ruler.Scientific notation.Sheaf (mathematics).Singularity theory.Smooth morphism.Smoothness.Special case.Subring.Summation.Surjective function.Tangent cone.Tangent space.Tangent.Taylor series.Theorem.Topology.Toric variety.Transversal (geometry).Variable (mathematics).Weierstrass preparation theorem.Weierstrass theorem.Zero set.Singularities (Mathematics)516.3/5SK 240rvkKollár János65993MiAaPQMiAaPQMiAaPQBOOK9910778222903321Lectures on resolution of singularities731847UNINA