This spectacular theorem was announced by Richard Taylor on Thursday, in a lecture at the joint meetings. Taylor credited this result and others to Allen-Calegari-Caraiani-Gee-Helm-Le Hung-Newton-Scholze-Taylor-Thorne (!), as an outcome of the (not so) secret mini-conference which took place at the IAS this fall. The key new input here is work in progress of Caraiani-Scholze on the cohomology of non-compact unitary Shimura varieties, which can be leveraged to check (at least in some cases) the most difficult hypothesis in the Calegari-Geraghty method: local-global compatibility at l=p for torsion classes.
The slides from my talk can be found here. Naturally I managed to say “diamond” a bunch of times.
Let be a proper variety over some field, and let be a vector bundle on . The functor of global sections of , i.e. the functor sending a scheme to the set , is (representable by) a nice affine -scheme, namely the scheme . Let denote the subfunctor corresponding to nowhere-vanishing sections . We’d like this subfunctor to be representable by an open subscheme. How should we prove this?
Let be the structure map. The identity map corresponds to a universal section . Let denote the zero locus of . This is a closed subset. But now we observe that the projection is proper, hence universally closed, and so is a closed subset of . One then checks directly that is the open subscheme corresponding to the open subset , so we win.
I guess this sort of thing is child’s play for an experienced algebraic geometer, and indeed it took Johan about 0.026 seconds to suggest that one should try to argue using the universal section. I only cared about the above problem, though, as a toy model for the same question in the setting of a vector bundle over a relative Fargues-Fontaine curve . In this situation, is a diamond over , cf. Theorem 22.5 here, but it turns out the above argument still works after some minor changes.
1 (from Patrick Allen) Let be a number field, and let be a cohomological cuspidal automorphic representation of some . Suppose that exists and satisfies local-global compatibility at all places, and that as predicted by Bloch-Kato. Then the following are equivalent:
a) , as predicted by Jannsen’s conjecture;
b) has the right dimension;
c) The product of restriction maps is injective.
The equivalence of a) and b) follows from Tate’s global Euler characteristic formula, but their equivalence with c) was news to me. The question of whether or not c) holds came up incidentally in my work with Jack on Venkatesh’s conjecture, so it was very pleasing to learn that it follows from Bloch-Kato + Jannsen.
2 (from Keerthi Madapusi Pera) If is semisimple and simply connected, and isotropic (i.e. contains some -split torus), then has no proper finite-index subgroups.
3 (from Stefan Patrikis) Let be as in 1) again. There are two number fields naturally associated with (besides ): the field generated by its Hecke eigenvalues, and the “reflex field” of its cohomological weight. Is there any chance that is always a subfield of ?, I asked SP. Yes, said he.
Sorry for the lack of blogging. It’s been a busy semester.
Let be an algebraically closed field, and let be a -dimensional affine variety over . According to a famous theorem of Artin (Corollaire XIV.3.5 in SGA 4 vol. 3), the etale cohomology groups vanish for any and any torsion abelian sheaf on . This is a pretty useful result.
It’s natural to ask if there’s an analogous result in rigid geometry. More precisely, fix a complete algebraically closed extension and a -dimensional affinoid rigid space over . Is it true that vanishes for (say) any and any -sheaf on for prime to ?
I spent some time trying to prove this before realizing that it fails quite badly. Indeed, there are already counterexamples in the case where is the -variable affinoid disk over . To make a counterexample in this case, let be the interior of the (closed, in the adic world) subset of defined by the inequalities for all ; more colloquially, is just the adic space associated to the open subdisk of (poly)radius . Let be the natural inclusion. I claim that is then a counterexample. This follows from the fact that is naturally isomorphic to , together with the nonvanishing of the latter group in degree .
Note that although I formulated this in the language of adic spaces, the sheaf is overconvergent, and so this example descends to the Berkovich world thanks to the material in Chapter 8 of Huber’s book.
It does seem possible, though, that Artin vanishing might hold in the rigid world if we restrict our attention to sheaves which are Zariski-constructible. As some (very) weak evidence in this direction, I managed to check that vanishes for any one-dimensional affinoid rigid space . (This is presumably well-known to experts.)
I wonder what this wild mess –
– is all about? If you’re in the Chicago area next week, come and find out!
Let be a complete algebraically closed extension, and let be the Fargues-Fontaine curve associated with . If is any vector bundle on , the cohomology groups vanish for all and are naturally Banach-Colmez Spaces for . Recall that the latter things are roughly “finite-dimensional -vector spaces up to finite-dimensional -vector spaces”. By a hard and wonderful theorem of Colmez, these Spaces form an abelian category, and they have a well-defined Dimension valued in which is (componentwise-) additive in short exact sequences. The Dimension roughly records the -dimension and the -dimension, respectively. Typical examples are , which has Dimension , and , which has Dimension .
Here I want to record the following beautiful Riemann-Roch formula.
Theorem. If is any vector bundle on , then .
One can prove this by induction on the rank of , reducing to line bundles; the latter were classified by Fargues-Fontaine, and one concludes by an explicit calculation in that case. In particular, the proof doesn’t require the full classification of bundles.
If you missed the awesome p-adic Langlands conference at Indiana University this past May, videos of all the talks are now available here.
Some talks I really liked: Bergdall, Cais, Hellmann, Ludwig.
Weirdest talk: [redacted]