Fitting ideal
In commutative algebra, the Fitting ideals of a finitely generated module over a commutative ring describe the obstructions to generating the module by a given number of elements. They were introduced by Hans Fitting (1936).
Definition
If M is a finitely generated module over a commutative ring R generated by elements m1,...,mn with relations
then the ith Fitting ideal of M is generated by the minors (determinants of submatrices) of order of the matrix . The Fitting ideals do not depend on the choice of generators and relations of M.
Some authors defined the Fitting ideal to be the first nonzero Fitting ideal .
Properties
The Fitting ideals are increasing
If M can be generated by n elements then Fittn(M) = R, and if R is local the converse holds. We have Fitt0(M) ⊆ Ann(M) (the annihilator of M), and Ann(M)Fitti(M) ⊆ Fitti−1(M), so in particular if M can be generated by n elements then Ann(M)n ⊆ Fitt0(M).
Examples
If M is free of rank n then the Fitting ideals are zero for i<n and R for i ≥ n.
If M is a finite abelian group of order (considered as a module over the integers) then the Fitting ideal is the ideal .
The Alexander polynomial of a knot is a generator of the Fitting ideal of the first homology of the infinite abelian cover of the knot complement.
Fitting image
The zeroth Fitting ideal can be used also to give a variant of the notion of scheme-theoretic image of a morphism, a variant that behaves well in families. Specifically, given a finite morphism of noetherian schemes , the -module is coherent, so we may define as a coherent sheaf of -ideals; the corresponding closed subscheme of is called the Fitting image of f.[1]
References
- Eisenbud, David; Harris, Joe. The Geometry of Schemes. Springer. p. 219. ISBN 0-387-98637-5.
- Eisenbud, David (1995), Commutative algebra, Graduate Texts in Mathematics, vol. 150, Berlin, New York: Springer-Verlag, ISBN 978-0-387-94268-1, MR 1322960
- Fitting, Hans (1936), "Die Determinantenideale eines Moduls", Jahresbericht der Deutschen Mathematiker-Vereinigung, 46: 195–228, ISSN 0012-0456
- Mazur, Barry; Wiles, Andrew (1984), "Class fields of abelian extensions of Q", Inventiones Mathematicae, 76 (2): 179–330, doi:10.1007/BF01388599, ISSN 0020-9910, MR 0742853
- Northcott, D. G. (1976), Finite free resolutions, Cambridge University Press, ISBN 978-0-521-60487-1, MR 0460383