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\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 left comment #10621 on Item 50

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On left comment #10620 on Theorem 11.6.1 in Brauer groups

A bit more justification is needed in the proof as to why the two -module structures of coincide, and I propose the following. Call these two -modules and . They have the same -dimension which is the -dimension of . Each of them is a direct sum of simple -modules. As there is up to -isomorphism a unique simple -module, and are isomorphic as -modules. This isomorphism induces an -isomorphism of , which must be multiplication by a unit of .


On Davide Pierrat left comment #10619 on Lemma 10.32.5 in Commutative Algebra

I would change to either (the cleanest looking) or (the sharp one). Hopefully I am not making a mistake.


On ZL left comment #10618 on Lemma 91.7.3 in Deformation Theory

Sorry my last comment is wrong. Please ignore it. The typo would be "" the definition of the ideal ).


On ZL left comment #10617 on Lemma 91.7.3 in Deformation Theory

Typo : First line of the thrid paragraph : "".


On Noah Olander left comment #10616 on Lemma 39.23.4 in Groupoid Schemes

Sorry, it doesn't seem to like #'s in math mode so I'll write * instead. Cayley-Hamilton says the polynomial annihilates the element . Since the coefficients of are in , we get that in . Since is faithfully flat, we get that .


On Noah Olander left comment #10615 on Lemma 39.23.4 in Groupoid Schemes

This is maybe too much detail but just to spell out the last sentence: Cayley-Hamilton says the polynomial annihilates . Since the coefficients of are in , we get which implies as is faithfully flat.


On ZL left comment #10614 on Lemma 91.7.1 in Deformation Theory

Another typo (sorry...) : before the defition of and : "we obtain two homomorphisms of -algebras..."

It seems that in step , the -algebra morphism will agree with over instead of being . (In fact in the proof, it is constructed rather than . ) One may still conclude step as in the proof of Lemma 91.2.1 by showing that is the pushout of and .


On ZL left comment #10613 on Lemma 91.7.1 in Deformation Theory

Typo : in the definition of : "...which sends the class of a local section of to ..."


On ZL left comment #10612 on Lemma 91.2.1 in Deformation Theory

Typo : is written as twice in the proof: "Note that there is a surjection whose kernel is " and "...we see that these maps agree on .

Also a silly question : could you spill out how the commutative square involing and implies that and agree on ? I tried some diagram chasing with no success.


On Noah Olander left comment #10611 on Proposition 39.23.9 in Groupoid Schemes

In (3) of the statement, "equivalence" should say "equivalence relation."


On Nicolás left comment #10610 on Section 13.6 in Derived Categories

My bad, the links didn't worked. The first one is Karmazyn--Kuznetsov--Shinder "Derived categories of singular surfaces" (arXiv:1809.10628), and the second one is Mauri--Shinder "Homological Bondal-Orlov localization conjecture for rational singularities" (arXiv:2212.06786)


On Nicolás left comment #10609 on Section 13.6 in Derived Categories

Say for example is a resolution of a variety with rational singularties. There is a semi-orthogonal decomposition , and so is a Verdier quotient on the left unbounded categories. One could ask if this is true also for the bounded derived categories, in which case the criterion can be used. See for instance the proof of Proposition 2.19 (pp. 17--8) of \ref{https://arxiv.org/pdf/1809.10628}, and the introduction of \ref{https://arxiv.org/pdf/2212.06786}.


On Dinglong Wang left comment #10608 on Remark 20.42.12 in Cohomology of Sheaves

Minor typos: every instance of in and should be replaced by .

is not used in the remark.

If we want to stay consistent with the previous notations, we should change all instances like to , update the bottom right corner to and remove in "let , , be objects of ...$.


On left comment #10607 on Lemma 10.12.10 in Commutative Algebra

Thanks and fixed here.


On left comment #10606 on Lemma 10.10.1 in Commutative Algebra

Okay, I did this here.


On left comment #10605 on Section 13.6 in Derived Categories

Before you do: what is an example where one might use that?


On left comment #10604 on Lemma 37.68.3 in More on Morphisms

Fixed here.


On left comment #10603 on Lemma 52.15.3 in Algebraic and Formal Geometry

Indeed. Fixed here.


On left comment #10602 on Lemma 15.106.2 in More on Algebra

Your argument uses results from chapters beyond this one, so it won't work. You can probably dumb down the proof quite a bit, but I actually find it quite an amusing argument.


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