Divisor (algebraic geometry): Difference between revisions

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In [[geometry]] a '''divisor''' on an [[algebraic variety]] is a formal sum (with integer coefficients) of [[subvariety|subvarieties]].
In [[geometry]] a '''divisor''' on an [[algebraic variety]] is a formal sum (with integer coefficients) of [[subvariety|subvarieties]].


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The ''support'' of a divisor is the set of points with non-zero coefficients in the sum.
The ''support'' of a divisor is the set of points with non-zero coefficients in the sum.


The divisor of a function ''f'', denoted <math>(f)</math> or <math>\mathop{\mathrm{div}} f</math>, is supported on the [[pole]]s and [[zero]]es of the function, with coefficients the degree of the pole or zero, with positive sign for zeroes and negative sign for poles.  The degree of the divisor of a function is zero.
The divisor of a function ''f'', denoted <math>(f)</math> or <math>\mathop{\mathrm{div}} f</math>, is supported on the [[pole]]s and [[zero]]es of the function, with coefficients the degree of the pole or zero, with positive sign for zeroes and negative sign for poles.  The degree of the divisor of a function is zero.[[Category:Suggestion Bot Tag]]

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In geometry a divisor on an algebraic variety is a formal sum (with integer coefficients) of subvarieties.

An effective divisor is a sum with non-negative integer coefficients.

Divisors on a curve

On an algebraic curve, a divisor is a formal sum of points

with degree

The support of a divisor is the set of points with non-zero coefficients in the sum.

The divisor of a function f, denoted or , is supported on the poles and zeroes of the function, with coefficients the degree of the pole or zero, with positive sign for zeroes and negative sign for poles. The degree of the divisor of a function is zero.