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I am looking for a reference for the following well-known fact: For any subdiagram $\Delta_0$ of of the Dynkin diagram $\Delta=D(G)$ of an adjoint simple group $G$ over an algebraically closed field $k$, there exists a reductive subgroup of maximal rank $G_0\subset G$ with Dynkin diagram $\Delta_0$.

To be more precise, I am looking for a reference for a proof of the following well-known lemma:

Lemma 1. Let $G$ be an adjoint, connected, simple algebraic group with Dynkin diagram $\Delta=D(G)$ over an algebraically closed field $k$ of any characteristic. Let $\Delta_0$ be a subdiagram of $\Delta$ (that is, a subset $\Pi_0$ of the set $\Pi$ of vertices of $\Delta$, together with all the edges of $\Delta$ connecting pairs of vertices of $\Pi_0$). Then there exists a connected reductive $k$-subgroup of maximal rank $G_0$ of $G$ such that the corresponding adjoint semisimple group $G_0^{ad}$ has Dynkin diagram $\Delta_0$.

I know a simple proof of Lemma 1, but I would prefer to give a reference rather than a proof.

The proof goes as follows. Let $T$ be a maximal torus of $G$, and let $R=R(G,T)$ be the root system, then our $\Pi$ is a basis of $R$. Let $S$ be the subgroup of $T$ orthogonal to $\Pi_0$, then it is a subtorus of $T$ (because $G$ is adjoint). Set $G_0=C_G(S)$, the centralizer of $S$ in $G$. Then $G_0$ is a connected reductive subgroup of $G$. It is easy to see that (the adjoint group of) $G_0$ has Dynkin diagram $\Delta_0$.

Note that Lemma 1 is a special case of the following Lemma 2, for which I would also be happy to have a reference.

Lemma 2. Let $G$ be an adjoint, connected, simple algebraic group over an algebraically closed field $k$ of any characteristic. Let $T$ be a maximal torus of $G$, and let $R=R(G,T)$ be the root system. Let $R_0$ be a closed symmetric subset of $R$. Then there exists a connected reductive $k$-subgroup of maximal rank $G_0$ of $G$ with root system $R_0$.

I will be grateful to any references, comments, etc. (also to a proof of Lemma 2).

Mikhail Borovoi

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2 Answers 2

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Dear Mikhail,

If I understand correctly, your Lemma 2 is implied by SGA 3 Exposé 22, Théorème 5.4.7.

Everything is on a general base S (that you may take as your algebraically closed field). The kind of subgroup you want is called "de type (R)" (see Définition 5.2.1) and a subset of R that corresponds to such a group is also called "de type (R)". Now the theorem above exactly says that when a subset of R is closed, it is "de type (R)" which exactly means that there is a corresponding connected subgroup of G. By the way, Théorème 5.4.7 does not assume the subset to be symmetric, and you get things like Borel subgroups if you take only "half" of the roots. In the symmetric case, the group is reductive by Proposition 5.10.1.

Hope this helps.

Baptiste Calmès

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  • $\begingroup$ This theorem from SGA 3 is an efficient reference for Lemma 2, though the background and setting are more than needed to describe the structure theory over an algebraically closed field. Concretely, the desired subgroup is generated by a maximal torus together with pairs of root subgroups (or the rank 1 semisimple groups they generate). The standard commutation relations show that no further roots appear if the given set of roots is closed and symmetric. Here as in SGA 3, the Lie algebra reflects accurately what is going on since the subgroup is of maximal rank. $\endgroup$ Mar 20, 2010 at 14:29
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Here is a short answer, which can be filled in further. Whether your group is of adjoint type or not probably makes little difference. Work going back to a fundamental paper of Borel and deSiebenthal leads to explicit information about the subgroups of maximal rank in a connected reductive group (eventually over any algebraically closed field, though at first just in characteristic 0).

For your Lemma 1, you just need a Levi subgroup of a parabolic subgroup, as described in any of the standard texts on linear algebraic groups (Borel, Springer, or my book). For Lemma 2, the foundations were laid over fairly general fields by Borel and Tits in their 1965 paper Groupes reductifs in the IHES Publ. Math. (I'll have to dig out more explicit references.) Anyway, an overview with references about subgroups of maximal rank is given in section 2.1 of my 1995 AMS book, Conjugacy Classes in Semisimple Algebraic Groups (algebraically closed case).

Concerning terminology, you are really working with subsets of the root system in each case (with the Dynkin diagram just a way of encoding data about the chosen simple roots). Bourbaki's Chapter VI has a lot of root system discussion related to Borel-Tits, for example involving symmetric subsets.

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  • $\begingroup$ Your proof of Lemma 1 is clear. Concerning Lemma 2, I would be grateful for details. $\endgroup$ Mar 19, 2010 at 18:10
  • $\begingroup$ I will look further at literature later this weekend, but meanwhile I think the essential point coming from the 1949 Borel-de Siebenthal paper (as generalized to the algebraic group situation in any characteristic) is that the connected reductive subgroups of maximal rank are generated by a maximal torus along with root subgroups belonging to a root system found via the extended Dynkin diagram. Sets of simple roots only generate the root systems in Levi subgroups; the others are usually called "pseudo-Levi", like the copy of $A_2$ inside $G_2$. $\endgroup$ Mar 19, 2010 at 21:02
  • $\begingroup$ Evgeny Vdovin in his notes in Russian math.nsc.ru/~vdovin/alggroups.pdf gives the following algorithm. From the Dynkin diagram of a root system R we construct the extended Dynkin diagram, and then from this extended Dynkin diagram we remove one or more vertices. Then for each of the remaining connected components we can repeat this procedure. The diagrams that we can obtain in this way are the Dynkin diagrams of all symmetric closed subsets of R. Vdovin refers to Borel-de Siebenthal and to Dynkin, Mat. Sbornik 1952. $\endgroup$ Mar 20, 2010 at 12:54
  • $\begingroup$ Yes, this is the way it was understood originally. Even though the papers assume characteristic 0, the ideas carry over well to any algebraically closed field. But in later literature more emphasis was placed on describing centralizers of semisimple elements as in Chapter 2 of my 1995 book and the sources cited. This constructs subgroups of maximal rank less directly than you want. It's hard to locate a reference for your Lemma 2 short of SGA 3. (But see Bourbaki, VI.1.7 on closed symmetric sets of roots, especially Prop. 23.) $\endgroup$ Mar 20, 2010 at 14:40

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