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The Stacks project

Comments 1 to 20 out of 9272 in reverse chronological order.

\begin{equation*} \DeclareMathOperator\Coim{Coim} \DeclareMathOperator\Coker{Coker} \DeclareMathOperator\Ext{Ext} \DeclareMathOperator\Hom{Hom} \DeclareMathOperator\Im{Im} \DeclareMathOperator\Ker{Ker} \DeclareMathOperator\Mor{Mor} \DeclareMathOperator\Ob{Ob} \DeclareMathOperator\Sh{Sh} \DeclareMathOperator\SheafExt{\mathcal{E}\mathit{xt}} \DeclareMathOperator\SheafHom{\mathcal{H}\mathit{om}} \DeclareMathOperator\Spec{Spec} \newcommand\colim{\mathop{\mathrm{colim}}\nolimits} \newcommand\lim{\mathop{\mathrm{lim}}\nolimits} \newcommand\Qcoh{\mathit{Qcoh}} \newcommand\Sch{\mathit{Sch}} \newcommand\QCohstack{\mathcal{QC}\!\mathit{oh}} \newcommand\Cohstack{\mathcal{C}\!\mathit{oh}} \newcommand\Spacesstack{\mathcal{S}\!\mathit{paces}} \newcommand\Quotfunctor{\mathrm{Quot}} \newcommand\Hilbfunctor{\mathrm{Hilb}} \newcommand\Curvesstack{\mathcal{C}\!\mathit{urves}} \newcommand\Polarizedstack{\mathcal{P}\!\mathit{olarized}} \newcommand\Complexesstack{\mathcal{C}\!\mathit{omplexes}} \newcommand\Pic{\mathop{\mathrm{Pic}}\nolimits} \newcommand\Picardstack{\mathcal{P}\!\mathit{ic}} \newcommand\Picardfunctor{\mathrm{Pic}} \newcommand\Deformationcategory{\mathcal{D}\!\mathit{ef}} \end{equation*}

On SM left comment #10157 on Lemma 108.9.4 in Moduli Stacks

In Tag 0DNJ, the proof has two \beta_{M,0}'s. One is \beta_{M,0}(\beta) (which should probably be \beta_{M,0}(\eta)) and the other is \beta_{M,0} without any input (which should probably read \beta_{M,0}(0)).


On left comment #10156 on Section 35.2 in Descent

@Vincent: The diagram in this definition is of sheaves on , so the maps on the pairwise fiber products all have to be pulled back to the triple product. In particular, we have a map of sheaves on the product of the first and last factors, and to compare this to our other maps of sheaves we take the induced map between the pullbacks of these sheaves along the natural projection .

(N.B. There isn't a , though - if we're pulling back we have to use the projection onto the first two factors instead.)


On left comment #10155 on Lemma 37.26.6 in More on Morphisms

I noticed an additional small optimization to this lemma: the flatness hypothesis can be weakened to instead require only the set-theoretic statement, namely, that the irreducible components of map to the generic point (rather than all associated points). This came up for me in a situation where I knew that and were reduced, was not sure whether was flat, and specifically wanted a technical lemma to imply that was reduced (en route to proving flatness, in fact).

Here's how the proof goes under the weakened hypothesis: after the same initial setup, we have lying over and we wish to show is reduced. Now by the set-theoretic hypothesis, is not in any minimal prime ideal of . The equation thus implies (since is nilpotent) that is in every minimal prime ideal, hence is again nilpotent. This contradicts reducedness of as in the current proof.


On Doug Liu left comment #10154 on Definition 4.17.1 in Categories

Should one require that is the fixed morphism ?


On 崔自强 left comment #10153 on Section 14.18 in Simplicial Methods

In the proof of Lemma 14.18.5, it is claimed that . But I think it should be because it is proven above that and element in should be elements whose first terms in the summation expression are zero.


On 崔自强 left comment #10152 on Section 14.18 in Simplicial Methods

In the proof of Lemma 14.18.5, it is claimed that . But I think it should be because it is proven above that and element in should be elements whose first terms in the summation expression are zero.


On Doug Liu left comment #10151 on Remark 60.9.6 in Crystalline Cohomology

In III, Remarque 3.2.5 of "Cohomologie cristalline des schémas de caractéristique ", Berthelot writes that may not be a morphism of ringed topoi. So perhaps one has to prove that in Situation 07MF, is a morphism of ringed topoi?


On ZL left comment #10150 on Lemma 101.38.2 in Morphisms of Algebraic Stacks

Typo : it seems that in the last two sentences the 's are missing : "Thus is an obeject " and "we conclude that is an object of as well".


On Félix Baril Boudreau left comment #10149 on Section 64.4 in The Trace Formula

In the sentence

"For a free -module, we have .",

I suggest we replace with .


On Liu left comment #10148 on Section 15.61 in More on Algebra

Sorry for the above empty comment, now I know the -module structure on . We just need to choose -resolutions and , then any induces a homomorphism , also induces a homomorphism . They commute on the bicomplex .


On Liu left comment #10147 on Section 15.61 in More on Algebra


On left comment #10146 on Theorem 15.90.16 in More on Algebra

Second sentence of proof: we will show that is a glueable module for


On left comment #10145 on Lemma 15.90.18 in More on Algebra

Second paragraph of the proof: remove extra "the" in "The long the exact sequence of Tors"


On left comment #10144 on Lemma 10.156.3 in Commutative Algebra

Two misprints:

  1. In the statement of the lemma it should be "the subfield of elements separable algebraic over ".
  2. In the first paragraph of the proof it should be "the compositum of and ".

On Edward van de Meent left comment #10143 on Definition 5.9.1 in Topology

I don't think that "descending chain condition" is defined anywhere in the project. a quick search suggests that this is the first place it is mentioned in the stacks project. similar for ascending chain condition. Is this something that should be defined in the project?


On ZL left comment #10141 on Lemma 96.17.3 in Sheaves on Algebraic Stacks

Small typos : the three arrows "" should be "".


On Gary Ng left comment #10140 on Section 10.3 in Commutative Algebra

I personally believe in it should be "a" Noetherian -module instead of "an". In section there is a sentence says "Let be a Noetherian ring" . It might be a special case of words using . Therefore, I mention it in case it is a typo.


On Shubhankar left comment #10139 on Proposition 96.20.1 in Sheaves on Algebraic Stacks

*nerve not 'never'


On Shubhankar left comment #10138 on Proposition 96.20.1 in Sheaves on Algebraic Stacks

This lemma is important and sort of hard to find. I suggest the following slogan (or variant) 'Cohomology of a stack can be computed on the Cech never of a presentation'.


On left comment #10137 on Lemma 15.106.3 in More on Algebra

Three points:

  1. [line 4] To conclude is the unique minimal prime of , we also need the faithful flatness (not just the flatness) of .
  2. [line 10] It should be instead of .
  3. [line 25] To conclude that is a domain, just note that the inclusion together with the flatness of , give the inclusion , and it has already been proved that is a domain.

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