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In algebraic geometry normal crossings is the property of intersecting geometric objects to do it in a transversal way.

Normal crossing divisors

In algebraic geometry, normal crossing divisors are a class of divisors which generalize the smooth divisors. Intuitively they cross only in a transversal way.

Let A be an algebraic variety, and $Z = \cup_{i} Z_{i}$ a reduced Cartier divisor, with $Z_{i}$ its irreducible components. Then Z is called a smooth normal crossing divisor if either

(i) A is a curve, or

(ii) all

Z_{i}

are smooth, and for each component

Z_{k}

,

(Z - Z_{k}) |_{Z_{k}}

is a smooth normal crossing divisor.

Equivalently, one says that a reduced divisor has normal crossings if each point étale locally looks like the intersection of coordinate hyperplanes.

Normal crossings singularity

In algebraic geometry a normal crossings singularity is a point in an algebraic variety that is locally isomorphic to a normal crossings divisor.

Simple normal crossings singularity

In algebraic geometry a simple normal crossings singularity is a point in an algebraic variety, the latter having smooth irreducible components, that is locally isomorphic to a normal crossings divisor.

Examples

The normal crossing points in the algebraic variety called the Whitney umbrella are not simple normal crossings singularities.
The origin in the algebraic variety defined by $x y = 0$ is a simple normal crossings singularity. The variety itself, seen as a subvariety of the two-dimensional affine plane is an example of a normal crossings divisor.

References

Robert Lazarsfeld, Positivity in algebraic geometry, Springer-Verlag, Berlin, 1994.

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+In [[algebraic geometry]] '''normal crossings''' is the property of intersecting geometric objects to do it in a transversal way.
+==Normal crossing divisors==
+In [[algebraic geometry]], '''normal crossing divisors''' are  a class of [[Divisor (algebraic geometry)|divisors]] which generalize the smooth divisors. Intuitively they cross only in a transversal way.
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+Let ''A'' be an [[algebraic variety]], and <math>Z= \cup_i Z_i</math> a [[Divisor (algebraic geometry)|reduced Cartier divisor]], with <math>Z_i</math> its irreducible components. Then ''Z'' is called '''a smooth normal crossing divisor''' if either
+:(i) ''A'' is a [[algebraic curve|curve]], or
+:(ii) all <math>Z_i</math> are smooth, and for each component <math>Z_k</math>, <math>(Z-Z_k)|_{Z_k}</math> is a smooth normal crossing divisor.
+Equivalently, one says that a reduced divisor has normal crossings if each point [[étale topology|étale locally]] looks like the intersection of coordinate hyperplanes.
+==Normal crossings singularity==
+In [[algebraic geometry]] a '''normal crossings ''' singularity is a point in an [[algebraic variety]] that is [[locally]] isomorphic to a normal crossings divisor.
+==Simple normal crossings singularity==
+In [[algebraic geometry]] a '''simple normal crossings singularity''' is a point in an [[algebraic variety]], the latter having [[Smooth algebraic variety|smooth]] [[irreducible component]]s, that is [[locally]] isomorphic to a normal crossings divisor.
+==Examples==
+* The normal crossing points in the algebraic variety called the [[Whitney umbrella]] are not simple normal crossings singularities.
+* The origin in the algebraic variety defined by <math>xy=0</math> is a simple normal crossings singularity. The variety itself, seen as a subvariety of the two-dimensional [[Cartesian coordinate system|affine plane]] is an example of a normal crossings divisor.
+== References ==
+* Robert Lazarsfeld, ''Positivity in algebraic geometry'', Springer-Verlag, Berlin, 1994.
+[[Category:Algebraic geometry]]
+[[Category:Geometry of divisors]]

Average rectified value: Difference between revisions

Revision as of 23:20, 10 November 2013

Contents

Normal crossing divisors

Normal crossings singularity

Simple normal crossings singularity

Examples

References

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Average rectified value: Difference between revisions

Revision as of 23:20, 10 November 2013

Normal crossing divisors

Normal crossings singularity

Simple normal crossings singularity

Examples

References

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