Let $R$ be a polynomial ring, $I$ a homogeneous ideal, and let $\operatorname{pd}(R/I)$ denote its projective dimension. Is there a characterization of homogeneous elements $a\in R\setminus I$ for which we have strict inequality:
$$(\dagger) \ \ \operatorname{pd}(R/I)<\operatorname{pd}(R/(I+(a)))?$$
For example I think that if $a$ is not a zero divisor for $R/I$ then $(\dagger)$ holds by Corollary 4.3.14 in Weibel's book. I'm wondering if there are other examples of $a$'s where $(\dagger)$ holds? Or is it an if and only if, i.e. $(\dagger)$ holds if and only if $a$ is a nonzero divisor for $R/I$? Any examples or references or comments would be greatly appreciated.
$\begingroup$
$\endgroup$
5
-
1$\begingroup$ Take $R=k[x,y]$, $I=(x^2,xy)$ and $a=x$. Then projective dimension of $R/I=2$, projective dimension of $R/I+(a)=1$. $\endgroup$– MohanCommented Nov 26, 2017 at 20:41
-
$\begingroup$ Thanks for the example! I guess I'm particularly interested in examples where $(\dagger)$ does hold, especially if its a zero divisor if $R/I$. Still, thanks :-) $\endgroup$– Chris McDanielCommented Nov 26, 2017 at 20:59
-
1$\begingroup$ The same example works. Take $I=(x^2), a=xy$ (or the other way works too). Then projective dimension of $R/I=1$, $xy$ is a zero divisor in $R/I$ and projective dimension of $R/(x^2,xy)=2$. $\endgroup$– MohanCommented Nov 26, 2017 at 22:26
-
$\begingroup$ I'm voting to close this question because it's already been answered in the comments. $\endgroup$– David WhiteCommented Nov 27, 2017 at 15:40
-
$\begingroup$ Hmmm...well I guess I got one example, but the question whether there is a characterization of such a's has certainly not been settled... $\endgroup$– Chris McDanielCommented Nov 27, 2017 at 15:57
Add a comment
|