## Scholze on Torsion, Part I

This is a sequel to this post, although as it turns out we still won’t actually get to anything substantial — or indeed anything beyond an introduction — in this post.

Let me begin with some overview. Suppose that $X = \Gamma \backslash G/K$ is a locally symmetric space, where $G$ is a semi-simple group which does not admit discrete series. To be concrete, suppose that $G = \mathrm{SL}_2(\mathbf{C}),$ and that $\Gamma$ is an congruence subgroup of level $N$ in the Bianchi group $\mathrm{SL}(\mathcal{O}_F)$ — recall here that $F$ is an imaginary quadratic field. Since days of yore (Langlands, Clozel, Fontaine-Mazur, etc.), everyone has expected that there should exist a bijection between the following objects:

1. Regular algebraic cuspidal autormophic representations $\pi$ for $\mathrm{GL}_2(\mathbf{A}_F)$ of level $N$ and weight zero (= the same infinitesimal character as the trivial representation).
2. Cuspidal (= non-boundary) cohomology classes $H^1(\Gamma,\mathbf{R})$ which are eigenforms for the ring of Hecke operators $\mathbf{T}$.
3. Weakly compatible families of two-dimensional Galois representations of $F$ which are irreducible of level $N$ and Hodge-Tate weight $[0,1]$.
4. Irreducible semi-stable $p$-adic Galois representations of weight $[0,1]$ and level (determined in the usual way) dividing $N$.
5. Abelian Varieties of $\mathrm{GL}(2)$-type over $F$ which don’t have CM by $F$.

The equivalence between $(1)$ and $(2)$ follows from Matsushima/Franke. The (conjectural) relationship between $(1)$ and $(3)$ is the problem of reciprocity in the Langlands programme. It consists of two directions; existence (i.e. constructing Galois representations from automorphic forms) and modularity (i.e. showing nice Galois representations are automorphic). Both of these directions are difficult. The passage from $(5) \Rightarrow (3) \Rightarrow (4)$ is easy, whereas $(4) \Rightarrow (5)$ is basically the Fontaine-Mazur conjecture (not so easy). Actually even that last statement is not quite correct: if one knows that $V$ is pure of weight one with non-negative Hodge-Tate weights and arises up to twist in the cohomology of some smooth proper algebraic variety, then it should actually arise in cohomology without having to twist and hence come from an Abelian variety; proving this, however, is probably hard (as in Standard conjectures hard). Note that $(1) \Rightarrow (5)$ follows, in the case of classical modular forms, from a geometric construction of Shimura, but that idea doesn’t work here, and in fact this arrow is completely open and we shall say no more about it. In the particular case of imaginary quadratic fields, Harris, Soudry, and Taylor showed in 1992 that $(1) \Rightarrow (3)$ under certain favourable conditions. This case is slightly exceptional in this regard, since there exist functorial transfers of such $\pi$ to $\mathrm{GSp}(4)$ which do contribute to the $(\mathfrak{q},K)$-cohomology of Shimura varieties and hence can be directly related to the coherent cohomology of Shimura varieties (although not directly to Betti cohomology, because the corresponding weights are not regular.) As readers of this blog know, only very recently, Harris-Lan-Taylor-Thorne established the same result for $\mathrm{GL}_n$ over a CM field. (Small lie: not all the desired properties of the corresponding Galois representations, — i.e. local-global compatibility — have been established. I think Ila Varma is working this out for her thesis.)

It was observed early on that the cohomology groups of $X$ are not, in general, torsion free. So what then does a torsion class represent? Computations by Grunewald, Helling, and Mennicke in an 1978 paper suggested that torsion classes (specifically, two-torsion with Hecke eigenvalues in $\mathbf{F}_2$) in these groups should be associated to $\mathrm{GL}_2(\mathbf{F}_2) = S_3$ Galois representations of the field $F$. Apparently there are even some unpublished notes from Grunewald in 1972 doing similar things, although I have only ever heard rumors of their existence (to be fair, I heard those rumours from Grunewald, so they’re probably pretty reliable). So very early on there were hints that a further story was going on between torsion classes and Galois representations that wasn’t immediately related to the (conjectural) story coming from automorphic forms. The first general and precise conjecture along these lines were formulated by Ash in his 1992 Duke paper, with further refinements by Ash–Sinnott, and Ash–Doud–Pollack. Unlike the previous speculations of Grunewald, these conjectures were precisely formulated and falsifiable, and in the spirit of Serre’s original conjecture. Moreover, Herzig did actually come along and falsify them, by finding a more natural prediction for the set of possible Serre weights which turned out to be different from the formulation of Ash et. al., and Herzig’s formulation subsequently proved (numerically!) to give the right answer in these cases (Edit: see comments, this is not quite correct). At any rate, for quite some time, we have expected that mod-p torsion classes give rise to Galois representations, and following the conjectures of Serre, Ash, and others, one can be quite precise about exactly the local properties the corresponding Galois representations should have at primes of bad reduction. What is perhaps more recent is the idea that, especially for groups $G$ with no discrete series, that torsion is not merely a techincal nuisance, but rather is the source of “most” of the interesting Galois representations. In particular,

• The phenomenon whereby Galois representations coming from the countably many classical automorophic forms are dense in a suitable universal deformation ring (Böckle, Gouvêa-Mazur, Chenevier) will be totally false when $G$ does not have discrete series. On the other hand, the representations coming from torsion should cut out all of the universal deformation ring.
• That in order to answer the most pressing questions concerning reciprocity (even in characteristic zero!) one needs to understand torsion classes.
• $\qquad$

For one take on this, I might suggest reading Section 1.1, Speculations on
p-adic functorality, of this paper. For another interesting perspective, you should also read this, as well as the accompanying review.

So let us assume then that studying torsion representations and associating them to Galois representations is an Important Goal. How do we construct them? An observation also going back a long way (I believe to Harder??) is the following. Even though $G$ may not admit discrete series, there may exist a group $H$ containing a parabolic $P$ with $G$ as a Levi. If $H$ does admit discrete series, then there will exist a Shimura variety $X_{H}$ whose Borel-Serre compactification will have at least one boundary component which is a torus bundle over $X_{G}$, and as a result one obtains a map (with some mixing of degrees) $H^*(X_{G},\mathbf{Z}) \rightarrow H^*(\overline{X}_{H},\mathbf{Z})$. Now one is theoretically in better shape, because this map should be compatible (in some sense) with Hecke operators, and the latter group has a chance to admit comparisons to étale cohomology groups which do come with Galois representations. There are three immediate problems:

1. The compactification $\overline{X}_{H}$ will be singular, except in the case of modular curves.
2. Given a long exact sequence for (co)homology relative to a boundary divisor, it’s not clear whether the cohomology in the boundary ends up in $H^{i-1}$ or $H^{i}$.
3. Just because a class $[c]$ has an interesting Hecke eigensystem doesn’t mean that that étale cohomology sees an interesting Galois representation.

$\$

The third issue is a genuine problem. If one has a Hecke eigenclass $[c] \in H^*(X)$ in the etale cohomology of a Shimura variety, even in characteristic zero, then all one can deduce is that the corresponding Galois representation is annihilated by the corresponding characteristic polynomial of Frobenius. But this is not always enough to get the correct Galois representation! It’s probably worthwhile to consider two examples.

First, a somewhat degenerate example. Let $\mathbb{G} = \mathrm{GL}(1)/\mathbf{Q}$, $G = \mathbf{R}^{\times}$, $\mathbb{H} = \mathrm{SL}(2)/\mathbf{Q}$, and $H = \mathrm{SL}_2(\mathbf{R})$. Now $X_{G}$ is (for some level structure) a finite set of points, and $X_{H}$ is a modular curve with cusps. The boundary map realizes $X_{G}$ as a set of cusps in $X_{H}$. The Hecke operators act on cusps by the degree map, i.e. $T_p[c] = (1+p)[c]$. This coincides with the action of Hecke operators on $H^0(X_H)$. So, in the etale cohomology group $H^0(X_H)$ we have a Hecke eigenclass which we imagine (looking at the Hecke operators) to be associated to the Galois representation $1 \oplus \chi$ where $\chi$ is the cyclotomic character. Yet $H^0(X_H)$ is one dimensional, and so we only see half of the Galois representation, namely, the trivial character. Now as it turns out, the other piece of the Galois representation can be seen in $H^1(X_H)$, which is now mixed because $X_H$ is not projective (so the cuspidal part has motivic weight one, and this other piece of the Eisenstein series has weight two). So even in this trivial case, we see that a Hecke eigenclass in etale cohomology may have a less interesting Galois representation than the Hecke eigenvalues might suggest. From the Eicher-Shimura relation, we do get that the (trivial) Galois representation which does occur is annihilated by the characteristic polynomial of Frobenius $(\sigma - 1)(\sigma - \chi(\sigma))$, indeed it is annihilated by the first factor.

Second, let $\mathbb{G} = \mathrm{GL}(2)/F$, $G = \mathbf{GL}_2(\mathbf{C})$, $\mathbb{H} = U(2,2)/\mathbf{Q}$, and $H = U(2,2)$. Here $\mathbb{H}$ is taken to split over $F$. The cohomology of (a torus bundle over) the Bianchi group maps into the cohomology of $U(2,2)$. The characteristic polynomials of the Hecke operators are, morally, the following. If $\rho$ is the (conjectural) Galois representation associated to an eigenclass on the Bianchi group, then $r = \wedge^2 (\rho \oplus \rho^c)$ is a six dimensional (reducible) representation which is a direct sum $r = s \oplus \psi \oplus \psi^c$ for a four dimensional representation $s = \rho \otimes \rho^c$ and a Grossencharacter $\psi$ and its conjugate (which are related to the central character of the original form and its conjugate). Now the characteristic polynomials of Frobenius on this Galois representation are, by Eichler–Shimura, the characteristic polynomials of Hecke on the image of this cohomology class in the cohomology $H^*(X_{H})$. Without assuming one has $\rho$, one can phrase the above purely in terms of Satake parameters, but this way of saying it makes clearer what is going on, even though we don’t know yet that $\rho$ actually exists. If one could find the Galois representation $r$ (and in particular $s$) inside the etale cohomology of $X_H$ one would (almost) be done, but instead, the classes which actually turn up in etale cohomology in these degrees are the reducible terms in $r$ corresponding to the Grossencharacters rather than to the interesting representation $s$ we are looking for. So as above, even in characteristic zero, one has the interesting Hecke eigenclass, but not the Galois representation.

These examples suggest that to understand what is going on we first need to get a better understanding of Shimura varieties. Most of the recent history of understanding Shimura varieties (and the Galois representations associated to automorphic forms) has concentrated on the cohomology arising from cuspidal automorphic representations. In this classical setting, the automorphic representations have a classical avatar as global sections of certain coherent bundles on $X_H$. (For example, classical modular forms of weight $\ge 1$ are global sections of the line bundle $\omega^{\otimes k}$.) If we want to restrict to cusp forms, we can also take the corresponding extension of these sheaves to minimal (or toroidal, doesn’t matter) compactifications which vanish appropriately at the boundary. If we denote these automorphic bundles by $\mathcal{E}_{\mathrm{sub}}$, then another way of saying this is that the action of Hecke operators $\mathbf{T}$ on

$\bigoplus_{\mathcal{E}} H^0(\overline{X}_{H},\mathcal{E}_{\mathrm{sub}})$

is now understood if $X_H$ is, for example, a Shimura variety of unitary type over a totally real field. Even getting this far is a somewhat monumental task that required, amongst other things, Ngo’s work on the Fundamental Lemma, work of Kottwitz, Clozel, some large fraction of Jussieu, the work of Shin, and many more. In fact, as far as local-global compatibility goes, the ink is barely dry on the most recent work. Now we can at least state, in vague terms, the following:

Theorem [Scholze, IV.3.1]: For (many) Shimura varieties $X_H$, the action of $\mathbf{T}$ on torsion classes in Betti cohomology factors through the action on coherent cusp forms in characteristic zero.

Two examples: If $X_H$ is the modular curve, then this says that the action of Hecke operators on $H^1(X_H,\mathbf{Z}/p^n \mathbf{Z})$ can be realized by the action on classical modular cuspidal eigenforms modulo powers of $p$. Given how we think about modular forms, this is almost tautological, because, by Eichler-Shimura, we can pass between cohomology classes and classical modular forms (in this case, we can even do this via the Hodge decomposition of $H^1$). However, there is a little wrinkle: we do see Eisenstein classes in Betti cohomology, and this theorem says that we can realize these as coming from cusp forms, so this result also implies that there exist cusp forms which are congruent to Eisenstein classes modulo $p^n$. Since we are ultimately interested in classes coming from the boundary of some compactification, we don’t want to ignore this case. Still, it’s not so difficult to prove.

If $X_H$ comes from $U(2,1)/\mathbf{Q}$ (so it is a arithmetic complex hyperbolic manifold of real dimension $4$, also known as a Picard modular surface), then we can look at the group $H_1(X_H,\mathbf{Z}_p)$. The characteristic zero classes here are known to correspond to endoscopic automorphic representations (and thus to not exist in the co-compact case) and are understood. However, unlike in the modular curve case, we no longer know that this group is torsion free, and in general, it may not be. So, a priori, all we know about the torsion classes and their Hecke operators is that there exists a Galois representation which is annihilated by the characteristic polynomial of $T_p$, using Eichler-Shimura. These polynomials are all of fixed degree (three in this case), but that doesn’t give any lower bound on the dimension of this representation. This is an even more stark example of the well known phenomenon that Eichler-Shimura is pretty much useless for constructing Galois representations outside the case of dimension two where knowing both the trace and determinant tells you a lot. For example, suppose you have an irreducible representation $V$ of a finite group $G$ in characteristic zero such that all the elements of $g$ have a minimal polynomial of degree at most $d$: then you can’t a priori bound the dimension of $V$! As an example, the extra-special $2$-group of order $2^{1 + 2n}$ has a representation of dimension $2^n$ all of whose elements have images satisfying the degree two polynomials $x^2 - 1 = 0$ or $x^2 + 1 = 0$. So, before Scholze, we could not say anything about the dimensions of mod-$p$ Galois representations arising from torsion in the first homology of $U(2,1)$. However, using Scholze, we can now deduce that any such representation comes from a classical cusp form, and hence must (in this case) have dimension three!

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### 13 Responses to Scholze on Torsion, Part I

1. Molesworth 2 says:

In fairness, I’m not sure that Ash etc claimed to have written down a complete list of weights, so it’s a little strong to say that FH falsified them.

• You are correct: I just checked Ash-Doud-Pollack. They say “Note that the conjecture makes no claim of predicting all possible weights that yield an eigenclass with $\rho$ attached.”

2. Dear GR,

Regarding dimension of reps. and degrees of minimal polynomials, one can also note that the symmetric group on 6 letters has a 16 dimensional irrep, but obviously every element in the image has order at most 6. (Not to detract from the extraspecial example, but it was this case that really brought home to me the useless of Eichler–Shimura by itself as a tool for investigating dimensions of Galois reps.)

Cheers,

Matt

3. This is a tangential question but, in your comment that (4) implies (5) above you say:

“Actually even that last statement is not quite correct: if one knows that V is pure of weight one with non-negative Hodge-Tate weights and arises up to twist in the cohomology of some smooth proper algebraic variety, then it should actually arise in cohomology without having to twist and hence come from an Abelian variety; proving this, however, is probably hard (as in Standard conjectures hard).”

I’ve come to similar questions by a completely different route and can’t make up my mind whether this is true or not. What is your reason to think this holds?

• Dear Felipe,

My impression is that it should be true, but a good (heuristic) reason doesn’t immediately come to mind. One might naturally be tempted to make the following conjecture (*): Suppose that $M$ is a motive over $\mathbf{Q}$. Then $M$ can be realized geometrically (i.e. not up to twist) if and only the coefficients of the characteristic polynomials are integral.

The “only if” restriction is of course necessary. Since the Newton polygon always lies above the Hodge polygon, this implies that if $M$ has non-negative HT-weights then it should be geometric. One special case is when all the weights are the same, in which case the implication is that $M$ is a twist of an Artin motive; this was proven by Kisin-Wortmann (modulo Fontaine-Mazur plus Tate plus Grothendieck-Serre).

One reason to to both believe that conjecture (*) might be both true and difficult (even assuming the standard conjectures) is the following application. Suppose that $f = \sum a_n q^n$ is a classical normalized modular eigenform with coefficients in some field $E$. I claim that (*) implies that there exists infinitely many ordinary primes for $f$, i.e. a prime $p$ and an embedding $E \rightarrow \overline{\mathbf{Q}}_p$ such that $a_p$ is a unit.

Proof: Assume otherwise, so there only exists a finite set $S$ of such primes. We may assume that the weight is $\ge 3$, because the other cases are easy. After replacing $f$ by a highly ramified twist, we may assume that $a_p = 0$ for all primes $p$ which either divide $S$ or are ramified in the field $E$. It thus suffices to find one ordinary prime. Consider the motive (with coefficients in $E$) corresponding to $f$, and let $M$ be the restriction of scalars of this motive down to a motive with $\mathbf{Q}$ coefficients. By assumption, the eigenvalues of Frobenius at every prime have valuation at least one (here we use the bound on the weight and the fact that we have killed off the local factors at primes which ramify in $E$). It follows that the characteristic polynomials of $M(-1)$ are all integral. Yet $M(-1)$ cannot be geometric because it has $-1$ as a Hodge-Tate weight.

Of course, you might also argue this argument is evidence for conjecture (*) in the same way that a white shoe is evidence that all ravens are black…

• Molesworth 2 says:

For what it’s worth, I think the argument you’re giving here is perhaps due to Katz – my memory is that he presented it at the problems session for the Gross birthday conference

• Molesworth 2 says:

I guess section 6 of http://www.math.harvard.edu/conferences/gross_10/panel/panel.pdf records the discussion I’m referring to (but I remember him talking about the explicit example of modular forms – I think the problem of ordinarity for modular forms of higher weight is one of his favourite problems).

• Yes, I heard a very similar problem from Katz at tea one day (I can’t really tell from that link whether he is suggesting Conjecture (*) or not.) I was also at that problem session. Serre talked first about how there had been essentially no progress in questions regarding Galois representations since 1970, but he didn’t stay for the problem session. I just noticed that the notes record three questions/remarks from the audience, one from Matt and two from unnamed participants which happened to both be me.

• Molesworth 2 says:

I believe that when Serre was shown the transcript, he retracted his comments, and that’s why they’re not there.