Introduction to Algebraic Geometry by Igor V. Dolgachev
Introduction to Algebraic Geometry by Igor V. Dolgachev
Introduction to Algebraic Geometry by Igor V. Dolgachev
This book
explains the following topics: Systems of algebraic equations, Affine algebraic
sets, Morphisms of affine algebraic varieties, Irreducible algebraic sets and
rational functions, Projective algebraic varieties, Morphisms of projective
algebraic varieties, Quasi-projective algebraic sets, The image of a projective
algebraic set, Finite regular maps, Dimension, Lines on hypersurfaces, Tangent
space, Local parameters, Projective embeddings and Riemann-Roch Theorem.
This note
covers Playing with plane curves, Plane conics, Cubics and the group law, The
category of affine varieties, Affine varieties and the Nullstellensatz,
Functions on varieties, Projective and biration algeometry, Tangent space and
non singularity and dimension.
This note covers the following
topics: Functors, Isomorphic and equivalent categories, Representable functors,
Some constructions in the light of representable functors, Schemes: Definition
and basic properties, Properties of morphisms of schemes, general techniques and
constructions.
This note contains the following subtopics of Algebraic Geometry,
Theory of Equations, Analytic Geometry, Affine Varieties and Hilbert’s
Nullstellensatz , Projective Varieties and Bezout’s Theorem, Epilogue
An
introduction to both the geometry and the arithmetic of abelian varieties. It
includes a discussion of the theorems of Honda and Tate concerning abelian
varieties over finite fields and the paper of Faltings in which he proves
Mordell's Conjecture. Warning: These notes are less polished than the others.
This book explains
the following topics: Polarity, Conics, Plane cubics, Determinantal equations,
Theta characteristics, Plane Quartics, Planar Cremona transformations, Del Pezzo
surfaces, Cubic surfaces, Geometry of Lines.
These notes are an introduction to the theory of algebraic varieties. In
contrast to most such accounts they study abstract algebraic varieties, and not
just subvarieties of affine and projective space. This approach leads more
naturally into scheme theory.
This book explains the following topics: What is algebraic geometry,
Functions, morphisms, and varieties, Projective varieties, Dimension, Schemes,
Morphisms and locally ringed spaces, Schemes and prevarieties, Projective
schemes, First applications of scheme theory, Hilbert polynomials.