Arithmetic genus

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In mathematics, the arithmetic genus of an algebraic variety is one of some possible generalisations of the genus of an algebraic curve.

The arithmetic genus of a non-singular variety of dimension n over the complex numbers can be defined as a combination of Hodge numbers, namely

p_a = h^n,0 − h^{n − 1 ,0} + ... + (−1)ⁿh^1,0.

By using h^p,q = h^q,p this can also be manipulated to a formula that is an Euler characteristic in coherent cohomology for the structure sheaf O_M:

p_a = (−1)ⁿ(χ( O_M) − 1).

This definition therefore can be applied to varieties over any field. When n = 1 we have χ = 1 − g where g is the usual meaning of genus, so the definitions are compatible.

There is a second meaning of arithmetic genus, applied to singular curves.

See also: geometric genus

Retrieved from "http://en.wikipedia.org../../../a/r/i/Arithmetic_genus.html"

Category: Topological methods of algebraic geometry

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• This page was last modified 19:06, 28 September 2006 by Wikipedia user Bluebot. Based on work by Wikipedia user(s) Charles Matthews.
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