Multiplicity theory

In abstract algebra, multiplicity theory concerns the multiplicity of a module M at an ideal I (often a maximal ideal)

[math]\displaystyle{ \mathbf{e}_I(M). }[/math]

The notion of the multiplicity of a module is a generalization of the degree of a projective variety. By Serre's intersection formula, it is linked to an intersection multiplicity in the intersection theory.

The main focus of the theory is to detect and measure a singular point of an algebraic variety (cf. resolution of singularities). Because of this aspect, valuation theory, Rees algebras and integral closure are intimately connected to multiplicity theory.

Multiplicity of a module

Let R be a positively graded ring such that R is generated as an R₀-algebra and R₀ is Artinian. Note that R has finite Krull dimension d. Let M be a finitely generated R-module and F_M(t) its Hilbert–Poincaré series. This series is a rational function of the form

[math]\displaystyle{ \frac{P(t)}{(1-t)^d}, }[/math]

where [math]\displaystyle{ P(t) }[/math] is a polynomial. By definition, the multiplicity of M is

[math]\displaystyle{ \mathbf{e}(M) = P(1). }[/math]

The series may be rewritten

[math]\displaystyle{ F(t) = \sum_1^d {a_{d-i} \over (1 - t)^d} + r(t). }[/math]

where r(t) is a polynomial. Note that [math]\displaystyle{ a_{d-i} }[/math] are the coefficients of the Hilbert polynomial of M expanded in binomial coefficients. We have

[math]\displaystyle{ \mathbf{e}(M) = a_0. }[/math]

As Hilbert–Poincaré series are additive on exact sequences, the multiplicity is additive on exact sequences of modules of the same dimension.

The following theorem, due to Christer Lech, gives a priori bounds for multiplicity.^[1][2]

See also

• Dimension theory (algebra)
• j-multiplicity
• Hilbert–Samuel multiplicity
• Hilbert–Kunz function
• Normally flat ring

References

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