Wrapped distribution: Difference between revisions

In commutative algebra the Hilbert–Samuel function, named after David Hilbert and Pierre Samuel,^[1] of a nonzero finitely generated module ${\displaystyle M}$ over a commutative Noetherian local ring ${\displaystyle A}$ and a primary ideal ${\displaystyle I}$ of ${\displaystyle A}$ is the map ${\displaystyle {\chi }_M^I:\mathbb{\mathbb{N}}\to \mathbb{\mathbb{N}}}$ such that, for all ${\displaystyle n\in \mathbb{\mathbb{N}}}$,

${\displaystyle {\chi }_M^I(n)=\ell (M/I^{n+1}M)}$

where ${\displaystyle \ell }$ denotes the length over ${\displaystyle A}$. It is related to the Hilbert function of the associated graded module ${\displaystyle {\mathrm{gr}}_I(M)}$ by the identity

${\displaystyle {\chi }_M^I(n)={\displaystyle \sum _{i=0}^n}H({\mathrm{gr}}_I(M),i),}$

For sufficiently large ${\displaystyle n}$, it coincides with a polynomial function of degree equal to ${\displaystyle \dim ({\mathrm{gr}}_I(M))-1}$.^[2]

Examples

For the ring of formal power series in two variables ${\displaystyle k[[x,y]]}$ taken as a module over itself and graded by the order and the ideal generated by the monomials x² and y³ we have

${\displaystyle \chi (1)=1,\chi (2)=3,\chi (3)=5,\chi (4)=6\text{ and }\chi (k)=6\text{ for }k>4.}$^[3]

Degree bounds

Unlike the Hilbert function, the Hilbert–Samuel function is not additive on an exact sequence. However, it is still reasonably close to being additive, as a consequence of the Artin-Rees lemma. We denote by ${\displaystyle P_{I,M}}$ the Hilbert-Samuel polynomial; i.e., it coincides with the Hilbert–Samuel function for large integers.

Let ${\displaystyle (R,m)}$ be a Noethrian local ring and I a m-primary ideal. If

${\displaystyle 0\to M^{\prime }\to M\to M^{″}\to 0}$

is an exact sequence of finitely generated R-modules and if ${\displaystyle M/IM}$ has finite length,^[4] then we have:^[5]

${\displaystyle P_{I,M}=P_{I,M^{\prime }}+P_{I,M^{″}}-F}$

where F is a polynomial of degree strictly less than that of ${\displaystyle P_{I,M^{\prime }}}$ and having positive leading coefficient. In particular, if ${\displaystyle M^{\prime }\simeq M}$, then the degree of ${\displaystyle P_{I,M^{″}}}$ is strictly less than that of ${\displaystyle P_{I,M}=P_{I,M^{\prime }}}$.

Proof: Tensoring the given exact sequence with ${\displaystyle R/I^n}$ and computing the kernel we get the exact sequence:

${\displaystyle 0\to (I^{n}M\cap M^{\prime })/I^n{M}^{\prime }\to M^{\prime }/I^n{M}^{\prime }\to M/I^{n}M\to M^{″}/I^n{M}^{″}\to 0,}$

which gives us:

${\displaystyle {\chi }_M^I(n-1)={\chi }_{M^{\prime }}^I(n-1)+{\chi }_{M^{″}}^I(n-1)-\ell ((I^{n}M\cap M^{\prime })/I^n{M}^{\prime })}$.

The third term on the right can be estimated by Artin-Rees. Indeed, by the lemma, for large n and some k,

${\displaystyle I^{n}M\cap M^{\prime }=I^{n-k}((I^{k}M)\cap M^{\prime })\subset I^{n-k}{M}^{\prime }.}$

Thus,

${\displaystyle \ell ((I^{n}M\cap M^{\prime })/I^n{M}^{\prime })\le {\chi }_{M^{\prime }}^I(n-1)-{\chi }_{M^{\prime }}^I(n-k-1)}$.

This gives the desired degree bound.

References

• Eisenbud, David, Commutative Algebra with a View Toward Algebraic Geometry, Graduate Texts in Mathematics, 150, Springer-Verlag, 1995, ISBN 0-387-94268-8.