369 Documenta Math. Moduli Schemes of Generically Simple Azumaya Modules

Source URL: documenta.sagemath.org

• Algebra
• Abstract algebra
• Mathematics
• Algebraic geometry
• Ring theory
• Scheme theory
• Vector bundles
• Sheaf theory
• Ample line bundle
• Coherent sheaf
• Sheaf of modules
• Proj construction

669 Documenta Math. Ordinarity of Configuration Spaces and of Wonderful Compactifications

Source URL: documenta.sagemath.org

• Algebra
• Abstract algebra
• Geometry
• Algebraic geometry
• Compactification
• Blowing up
• Projective variety
• Divisor
• Moduli space
• Ample line bundle
• Algebraic variety
• Smooth scheme

Contents Preface . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . v Bibliography of David B. Mumford . . . . . . . . . . . . . . . . . . . . . . . .

Source URL: www.math.upenn.edu

• Fields Medalists
• Moduli theory
• Alexander Grothendieck
• Nicolas Bourbaki
• Stateless people
• Moduli scheme
• David Mumford
• Pierre Deligne
• Scheme
• Oscar Zariski
• Moduli space
• C. P. Ramanujam

Problems for Hausel’s Lectures 1. Assume E and F are stable bundles on a smooth projective curve C of the same slope. (a) Show that if f : E → F is a non-zero homomorphism then it is an isomorphism. (b) Deduce that a

Source URL: m2.geometry.de

• Algebraic geometry
• Vector bundles
• Projective variety
• Ample line bundle
• Stable vector bundle
• Smooth scheme
• Torsion tensor
• Tangent bundle
• Moduli space
• Projective bundle
• Coherent sheaf cohomology

369 Documenta Math. Moduli Schemes of Generically Simple Azumaya Modules

Source URL: www.math.uiuc.edu

• Algebraic geometry
• Ring theory
• Scheme theory
• Vector bundles
• Sheaf theory
• Ample line bundle
• Coherent sheaf
• Sheaf of modules
• Proj construction
• Moduli space
• Torsion-free module
• Azumaya algebra

GEOMETRY OF THE HURWITZ SCHEME The Geometry of the Compactification of the Hurwitz Scheme by Shinichi MOCHIZUKI*

Source URL: www.kurims.kyoto-u.ac.jp

• Algebraic geometry
• Algebraic space
• Stack
• Moduli space
• Divisor
• tale morphism
• Picard group
• Sheaf
• Scheme
• tale cohomology

MODULI SPACES AND DERIVED CATEGORIES AARON BERTRAM AND PAOLO STELLARI Derived categories and stability conditions (Paolo Stellari) For a smooth projective scheme X, the bounded derived category Db (X) of coherent sheaves

Source URL: germanio.math.unifi.it

Peter Scholze’s lectures on p-adic geometry∗, Fall 2014 ∗ Last updated on 29 JanThanks to Arthur Ogus and Jay Pottharst for helpful

Source URL: math.berkeley.edu

• Field theory
• Commutative algebra
• Scheme theory
• Galois theory
• P-adic number
• Moduli space
• Valuation
• P-adic Hodge theory
• Scheme
• Abstract algebra
• Algebra
• Algebraic number theory

MURPHY’S LAW IN ALGEBRAIC GEOMETRY: BADLY-BEHAVED DEFORMATION SPACES RAVI VAKIL A BSTRACT. We consider the question: “How bad can the deformation space of an object be?” The answer seems to be: “Unless there is s

Source URL: math.stanford.edu

• Moduli theory
• Scheme theory
• Invariant theory
• Algebraic surfaces
• Moduli space
• Resolution of singularities
• Enriques–Kodaira classification
• Surface of general type
• Moduli of algebraic curves
• Algebraic geometry
• Geometry
• Abstract algebra

THE AFFINE STRATIFICATION NUMBER AND THE MODULI SPACE OF CURVES MIKE ROTH AND RAVI VAKIL A BSTRACT. We define the affine stratification number asn X of a scheme X. For X equidimensional, it is the minimal number k such t

Source URL: math.stanford.edu

• Algebraic space
• Flat morphism
• Blowing up
• Affine geometry
• Proj construction
• Codimension
• Affine connection
• Algebraic variety
• Geometry
• Abstract algebra
• Algebraic geometry