Introduction to projective varieties

Algebraic Geometry I Lecture Notes Roman Bezrukavnikov

The contents of this book include: Course Introduction, Zariski topology, Affine Varieties, Projective Varieties, Noether Normalization, Grassmannians, Finite and Affine Morphisms, More on Finite Morphisms and Irreducible Varieties, Function Field, Dominant Maps, Product of Varieties, Separateness, Sheaf Functors and Quasi-coherent Sheaves, Quasi-coherent and Coherent Sheaves, Invertible Sheaves, (Quasi)coherent sheaves on Projective Spaces, Divisors and the Picard Group, Bezout’s Theorem, Abel-Jacobi Map, Elliptic Curves, KSmoothness, Canonical Bundles, the Adjunction Formulaahler Differentials, Cotangent Bundles of Grassmannians, Bertini’s Theorem, Coherent Sheves on Curves, Derived Functors, Existence of Sheaf Cohomology, Birkhoff-Grothendieck, Riemann-Roch, Serre Duality, Proof of Serre Duality.

Author(s): Roman Bezrukavnikov

63 Pages

Foundations Of Algebraic Geometry

This book is intended to give a serious and reasonably complete introduction to algebraic geometry, not just for experts in the field. Topics covered includes: Sheaves, Schemes, Morphisms of schemes, Useful classes of morphisms of schemes, Closed embeddings and related notions, Fibered products of schemes, and base change, Geometric properties: Dimension and smoothness, Quasicoherent sheaves, Quasicoherent sheaves on projective A-schemes, Differentials,Derived functors, Power series and the Theorem on Formal Functions, Proof of Serre duality.

Author(s): Ravi Vakil

764 Pages

Lecture Notes on Algebraic Geometry

This book covers the following topics: Introduction and Motivation, General definitions and results, Cubic curves, Curves of higher genus.

Author(s): MattKerr

331 Pages

Introduction to Algebraic Geometry I (PDF 20P)

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

Author(s): Sudhir R. Ghorpade

20 Pages

Algebraic Geometry Lecture Notes

This course provides an introduction to the language of schemes, properties of morphisms, and sheaf cohomology. Covered topics are: Basics of category theory, Sheaves, Abelian sheaves, Schemes, Morphisms of schemes, Sheaves of modules, More properties of morphisms, Projective morphisms, Projective morphisms, Flat morphisms and descent, Differentials Divisors, Divisors on curves, Homological algebra, Sheaf cohomology, Cohomology of quasicoherent sheaves, Cohomology of projective spaces, Hilbert polynomials, GAGA, Serre duality for projective space, Dualizing sheaves and RiemannRoch, CohenMacaulay schemes and Serre duality, Higher RiemannRoch  and Etale cohomology.

Author(s): Prof. Kiran Kedlaya

NA Pages

Lectures on Etale Cohomology

This book explains the following topics: Etale Morphisms, Etale Fundamental Group, The Local Ring for the Etale Topology, Sheaves for the Etale Topology, Direct and Inverse Images of Sheaves, Cohomology: Definition and the Basic Properties, Cohomology of Curves, Cohomological Dimension, Purity; the Gysin Sequence, The Proper Base Change Theorem, Cohomology Groups with Compact Support, The Smooth Base Change Theorem, The Comparison Theorem, The Kunneth Formula, Proof of the Weil Conjectures, The Weil Conjectures, The Geometry of Lefschetz Pencils and Cohomology of Lefschetz Pencils.

Author(s): J.S. Milne

202 Pages

Topics in Classical Algebraic Geometry

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.

Author(s): Igor V. Dolgachev

524 Pages

Algebraic Geometry

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.

Author(s): J.S. Milne

NA Pages

A Gallery of Algebraic Surfaces

This note explains the following topics: Algebraic surfaces, Singularities, Maximal numbers of singularities, Quartics, Enumerative geometry.

Author(s): Bruce Hunt

25 Pages

Riemann Surfaces and Algebraic Curves

This note describes the relation between algebraic curves and Riemann surfaces.

Author(s): Joel W. Robbin

8 Pages

Complex Algebraic Varieties

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NA Pages

Introduction to Algebraic Geometry

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Introduction to Numerical Algebraic Geometry

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Algebraic geometry and projective differential geometry

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Introduction to Algebraic Geometry

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Algebraic Geometry

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