https://stacks.math.columbia.edu/recent-comments.xml Stacks project, see https://stacks.math.columbia.edu en stacks.project@gmail.com (The Stacks project) pieterbelmans@gmail.com (Pieter Belmans) https://stacks.math.columbia.edu/static/stacks.png https://stacks.math.columbia.edu/recent-comments.rss https://stacks.math.columbia.edu/tag/00HL#comment-4954 A new comment by procvaustralia on tag 00HL. We offer all levels of resume writers writing service - AU Professional and Basic. Each of these writing services are tailored to our all customer's needs....

]]> procvaustralia Mon, 24 Feb 2020 07:10:19 GMT https://stacks.math.columbia.edu/tag/02GW#comment-4953 A new comment by awllower on tag 02GW. Suggested slogan: Cancellation law for étale morphisms.

]]> awllower Mon, 24 Feb 2020 12:01:17 GMT https://stacks.math.columbia.edu/tag/0B9J#comment-4952 A new comment by SDIGR on tag 0B9J. Typo!?:
Last sentence:
The divisor $D$ corresponding to a $k$-rational point of $\underline{\mathrm{Hilb}}_{X/k}^{d+1}$ must be of degree $d+1$, not of degree $d$.

]]> SDIGR Sun, 23 Feb 2020 03:04:44 GMT https://stacks.math.columbia.edu/tag/0B9H#comment-4951 A new comment by SDIGR on tag 0B9H. Sorry, I mean the other way around.

]]> SDIGR Sun, 23 Feb 2020 02:32:38 GMT https://stacks.math.columbia.edu/tag/0B9H#comment-4950 A new comment by SDIGR on tag 0B9H. First sentence of the Proof: $\underline{\mathrm{Hilb}_{X/S}^0}=S\mapsto\underline{\mathrm{Hilb}_{X/S}^d}=S$.

]]> SDIGR Sun, 23 Feb 2020 02:31:53 GMT https://stacks.math.columbia.edu/tag/0E6N#comment-4949 A new comment by Min on tag 0E6N. What is T in the functor the dualizing sheaf represents? Should it be U?

]]> Min Sun, 23 Feb 2020 09:22:20 GMT https://stacks.math.columbia.edu/tag/0E6N#comment-4948 A new comment by Min on tag 0E6N. What is $T$ in the functor the dualizing sheaf represents? Should it be $U$?

]]> Min Sun, 23 Feb 2020 09:21:07 GMT https://stacks.math.columbia.edu/tag/00LB#comment-4947 A new comment by yogesh on tag 00LB. Oops, sorry disregard my previous comment. I got forgot we're talkng about the annihilator as an element of $M$, not $M/M_{n-1}$. I was thinking of using the previous result of associated primes of short exact sequences applied to $M_{n-1} \to M \to R/\mathfrak{p}_n$ so $Ass(M) \subseteq Ass(M_{n-1} \cup \{ \mathfrak{p}_n\}$ But the proof you give is basically the proof of that result, whose proof is omitted.

]]> yogesh Sat, 22 Feb 2020 08:58:47 GMT https://stacks.math.columbia.edu/tag/00LB#comment-4946 A new comment by yogesh on tag 00LB. Oops, sorry disregard my previous comment. I got forgot we're talkng about the annihilator as an element of $M$, not $M/M_{n-1}$.

]]> yogesh Sat, 22 Feb 2020 08:53:02 GMT https://stacks.math.columbia.edu/tag/00LB#comment-4945 A new comment by yogesh on tag 00LB. In the proof, I think the inclusion $\mathfrak{p} \subset \mathfrak{p}_n$ is going the wrong way and the rest of the proof is unnecessary. I think any nonzero element of $R/\mathfrak{p}_n$ is annihilated by exactly by $\mathfrak{p}_n$.

]]> yogesh Sat, 22 Feb 2020 08:34:02 GMT