Recent comments—The Stacks project

Comments 1 to 20 out of 3693 in reverse chronological order.

On Dec 15, 2018 slogan_bot left comment #3839 on Lemma 25.23.6 in Schemes

Suggested slogan: "Any injective on topological spaces map of schemes is separated."

On Dec 14, 2018 Yuxuan left comment #3838 on Section 42.6 in Intersection Theory

You missed a $after$ \dim (f(Z)).

On Dec 13, 2018 anonymous left comment #3837 on Lemma 26.4.1 in Constructions of Schemes

This refers to Tag 01LR just above. It seems that the f on the right hand side should be the morphism making T into an S-scheme. So my suggestion is to write $(f \colon T \rightarrow S) \mapsto \{\text{$ \phi $as above}\}$ . (The right hand side should be in "set brackets" but it did not work in the preview.) In the representability statements below it would be good to say representable by an S-scheme.

On Dec 13, 2018 slogan_bot left comment #3836 on Lemma 57.13.1 in Algebraic Spaces

Suggested slogan: "The diagonal of any algebraic space is a separated, locally quasi-finite monomorphism"

On Dec 11, 2018 slogan_bot left comment #3833 on Lemma 28.24.15 in Morphisms of Schemes

Suggested slogan: "Schme theoretic image of a quasi-compact morphism commutes with flat base change"

On Dec 08, 2018 slogan_bot left comment #3832 on Lemma 15.12.7 in More on Algebra

Suggested slogan: "Henselization commutes with base change along integral maps"

On Dec 08, 2018 slogan_bot left comment #3831 on Lemma 15.12.6 in More on Algebra

Suggested slogan: "The Henselization of a pair only depends on the radical of the ideal"

On Dec 08, 2018 slogan_bot left comment #3830 on Lemma 15.12.4 in More on Algebra

Suggested slogan: "Henselization of a Noetherian pair is Noetherian and does not affect completions"

On Dec 07, 2018 Antoine VEZIER left comment #3829 on Lemma 30.15.2 in Divisors

Small typo on line 5 I think. It is a_i, h\in A and not h_i, h\in A.

On Dec 06, 2018 Andy left comment #3827 on Section 10.85 in Commutative Algebra

For lemma 0597, shouldn't it be A' nonempty instead?

On Dec 03, 2018 Xiaofa Chen left comment #3824 on Section 12.9 in Homological Algebra

Yes. It's my mistake. At that time, I just learned this theory and I took it for granted that it is universal among all functors which annihilate $\mathcal C$ . Then I realized that I is universal among exact functors which annihilate $\mathcal C$ . And I don't know how to delete a 'stupid comment' as that.

On Dec 03, 2018 Kestutis Cesnavicius left comment #3823 on Lemma 15.81.5 in More on Algebra

The statement can evidently be strengthened to `if and only if'.

On Dec 03, 2018 Johannes Anschuetz left comment #3822 on Lemma 36.34.6 in More on Morphisms

The "Y" in the diagram seems to mean "S".

On Dec 03, 2018 slogan_bot left comment #3821 on Lemma 90.4.1 in Artin's axioms

Suggested slogan: Algebraic stacks satisfy the Rim-Schlessinger condition

On Dec 03, 2018 slogan_bot left comment #3820 on Lemma 36.2.5 in More on Morphisms

Suggested slogan: A composition of thickenings is a thickening

On Dec 03, 2018 slogan_bot left comment #3819 on Lemma 36.2.3 in More on Morphisms

Suggested slogan: Affineness is insensitive to thickenings

On Dec 02, 2018 Sandor Kovacs left comment #3818 on Lemma 10.118.2 in Commutative Algebra

At the end of the fourth paragraph (starting with "If $y\mathfrak m\subset x\mathfrak m$ then...") it should be saying that "R′/R is a finite R-module annihilated by a power of $\mathfrak m$ " not that "R′/R is a finite R-module annihilated by a power of x".

On Nov 30, 2018 Alapan Mukhopadhyay left comment #3817 on Lemma 10.98.1 in Commutative Algebra

In the diagram $\frac{M}{IN+u(N)}$ is to be replaced by $\frac{M}{IM+u(N)}$ .

On Nov 30, 2018 Manuel Hoff left comment #3816 on Section 28.24 in Morphisms of Schemes

Possible typo in Lemma 01U8. At one point I think it should say $g'(x')$ instead of $g(x')$ .

On Nov 28, 2018 Kestutis Cesnavicius left comment #3815 on Lemma 28.40.1 in Morphisms of Schemes

Same comment as for https://stacks.math.columbia.edu/tag/01KE