Normal crossing singularity algebraic geometry a normal crossing singularity is a singularity similar to a union of coordinate hyperplanes. The term can be confusing because normal crossing singularities are not usually normal schemes .In algebraic geometry , normal crossing divisors are a class of divisors which generalize the smooth divisors. Intuitively they cross only in a transversal way.A be an algebraic variety , and a reduced Cartier divisor , with its irreducible components . Then Z is called a smooth normal crossing divisor if eitherreduced divisor has normal crossings if each point étale locally looks like the intersection of coordinate hyperplanes.Normal crossing 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 crossing 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 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. Any variety which is the union of smooth varieties which all have smooth intersections is a variety with normal crossing singularities. For example, let be irreducible polynomials defining smooth hypersurfaces such that the ideal defines a smooth curve . Then is a surface with normal crossing singularities.
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