bio | website | perso.univ-rennes1.fr/… |
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location | Rennes | |
age | 38 | |
visits | member for | 4 years, 5 months |
seen | 6 hours ago | |
stats | profile views | 645 |
Oct 17 |
answered | Wonderful applications of the Vandermonde determinant |
Oct 13 |
comment |
The quotient stack $[\mathbb{A}^n / \mathrm{GL}_n]$
@André, Ben: you're perfectly right of course. |
Oct 12 |
comment |
The quotient stack $[\mathbb{A}^n / \mathrm{GL}_n]$
This stack classifies vector bundles of rank $n$ together with $n$ global sections. You see it just like you see that $A^1/G_m$ classifies line bundles with a global section. |
Sep 23 |
comment |
Is every module the colimit of its finitely generated submodules? (for algebraic spaces or stacks)
David Rydh eventually removed the assumptions on the diagonal, see arxiv.org/abs/1408.6698. |
Sep 3 |
comment |
Existence of affine hulls
... by Matthieu Romagny's wrong answer to... |
Aug 29 |
revised |
Affine hulls and base change
added 95 characters in body |
Aug 28 |
revised |
Affine hulls and base change
added 155 characters in body |
Aug 28 |
comment |
Affine hulls and base change
Well, I may be wrong then. I'm editing my answer accordingly. |
Aug 27 |
comment |
Affine hulls and base change
Damned! I had overlooked that subtlety. At the moment I don't know how to argue -- do you have an example of a sheaf of modules on a scheme that does not embed into a quasi-coherent one ? What about a sheaf of the form $f_*O_X$? |
Aug 27 |
comment |
Affine hulls and base change
Dear Fred, I don't know a place where you can find this explained in full without the qcqs hypothesis. But you can find the lemma on existence of largest quasicoherent submodules in the Stacks Project under Lemma Tag 01QZ and then check for yourself that 1) in the case of a sheaf of algebras this largest thing is a subalgebra and 2) the Spec of this satisfies the universal property of the affine hull. For question B, sorry I misread. But I don't quite see what kind of condition on $S'\to S$ could do. |
Aug 27 |
answered | Affine hulls and base change |
Jul 4 |
comment |
A construction of the Hilbert-Chow morphism
One source is 'Local properties and Hilbert schemes of points' by Fantechi and Göttsche, in the volume 'Fundamental Algebraic Geometry' for the 2003 Trieste School, published by AMS. |
Jul 3 |
comment |
Fantastic properties of Z/2Z
Yes, I know that song, it's fantastic. |
Jul 2 |
awarded | Curious |
Jun 28 |
revised |
Descent of functions along finite birational morphisms
added 80 characters in body |
Jun 28 |
revised |
Descent of functions along finite birational morphisms
added 95 characters in body |
Jun 28 |
comment |
Descent of functions along finite birational morphisms
ps: in Olivier's note the result is the Corollary to Thm. 2.6. |
Jun 28 |
comment |
Descent of functions along finite birational morphisms
Dear anon, that's a great answer! In fact I thought a bit more and found out that result about descent along pure morphisms in the 1970 CRAS note 'Descente par morphismes purs' by J.-P. Olivier (no proof there). I read also in the The Stacks Project that Mesablishvili was the first to give full proofs of such statements. On the other hand I had made no connection with Reynolds operators. Thanks for these explanations and references! That's very useful to me. |
Jun 27 |
revised |
Descent of functions along finite birational morphisms
added 48 characters in body |
Jun 26 |
comment |
Descent of functions along finite birational morphisms
Dear user52824, I completed the proof with your insightful suggestions. Thanks! |