An Introduction to the Theory of Algebraic Surfaces by Oscar Zariski (PDF)

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    Ebook Info

    • Published: 2014
    • Number of pages: 112 pages
    • Format: PDF
    • File Size: 3.78 MB
    • Authors: Oscar Zariski

    Description

    Homogeneous and non-homogeneous point coordinates.- Coordinate rings of irreducible varieties.- Normal varieties.- Divisorial cycles on a normal projective variety V/k (dim(V)=r?1).- Linear systems.- Divisors on an arbitrary variety V.- Intersection theory on algebraic surfaces (k algebraically closed).- Differentials.- The canonical system on a variety V.- Trace of a differential.- The arithemetic genus.- Normalization and complete systems.- The Hilbert characteristic function and the arithmetic genus of a variety.- The Riemann-Roch theorem.- Subadjoint polynomials.- Proof of the fundamental lemma.

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