Multiplicity of a singular point
of an algebraic variety
An integer which is a measure of the singularity of the algebraic variety at that point. The multiplicity 
of a variety 
at a point 
is defined to be the multiplicity of the maximal ideal 
in the local ring 
. The multiplicity of 
at 
coincides with the multiplicity of the tangent cone 
at the vertex, and also with the degree of the special fibre 
of a blow-up 
of 
at 
, where 
is considered to be immersed in the projective space 
(see [3]). One has 
if and only if 
is a non-singular (regular) point of 
. If 
is a hypersurface in a neighbourhood of 
(i.e. 
is given by a single equation 
in an affine space 
), then 
is identical with the number 
such that 
, where 
is the maximal ideal in the local ring 
. The multiplicity does not change when 
is cut by a generic hypersurface through 
. If 
denotes the set of points 
such that 
, then 
is a closed subset (a subvariety).
References
| [1] | D. Mumford, "Algebraic geometry" , 1. Complex projective varieties , Springer (1976) |
| [2] | J.-P. Serre, "Algèbre locale. Multiplicités" , Lect. notes in math. , 11 , Springer (1965) |
| [3] | C.P. Ramanujam, "On a geometric interpretation of multiplicity" Invent. Math. , 22 : 1 (1973) pp. 63–67 |
Comments
For the multiplicity of the maximal ideal of a local ring, cf. Multiplicity of a module.
Multiplicity of a singular point. Encyclopedia of Mathematics. URL: http://encyclopediaofmath.org/index.php?title=Multiplicity_of_a_singular_point&oldid=11768