Derived from
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20402104 GE410 - ALGEBRAIC GEOMETRY 1 in Mathematics LM-40 N0 LOPEZ ANGELO
(syllabus)
Affine Spaces Zariski topology. Affine closed subsets and radical ideals. Theorem of the zeros of Hilbert. Correspondence between closed subsets and radical ideals. Noetherian topological spaces. Irreducible closed subsets, irreducible components. Regular functions of affine closed subsets. Regular maps, isomorphisms. Principal open subsets. Examples. Projections are open. Finite morphisms.
Varieties Projective spaces and their Zariski topology. Quasi-projective varieties. Rational and regular maps. Projective hypersurfaces. Birational equivalence. Principal open subsets and affine closed subsets. Affine varieties. Dimension of quasi-projective varieties. Finite and generically finite morphisms. Characterizations of birational equivalence. Characterization of generically finite morphisms. Costructible sets, Chevalley's theorem. Every variety is birational to a hypersurface.
Local geometry Local ring of a variety in a point. Zariski cotangent space. Zariski tangent space. Singular and non singular points.
(reference books)
L. Caporaso Introduction to algebraic geometry Notes of the course
I. Shafarevich Basic Algebraic geometry Springer-Verlag, Berlin, 1994
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