Congruence subgroup
Template:Short description In mathematics, a congruence subgroup of a matrix group with integer entries is a subgroup defined by congruence conditions on the entries. A very simple example is the subgroup of invertible Template:Nowrap integer matrices of determinant 1 in which the off-diagonal entries are even. More generally, the notion of congruence subgroup can be defined for arithmetic subgroups of algebraic groups; that is, those for which we have a notion of 'integral structure' and can define reduction maps modulo an integer.
The existence of congruence subgroups in an arithmetic group provides it with a wealth of subgroups, in particular it shows that the group is residually finite. An important question regarding the algebraic structure of arithmetic groups is the congruence subgroup problem, which asks whether all subgroups of finite index are essentially congruence subgroups.
Congruence subgroups of Template:Nowrap matrices are fundamental objects in the classical theory of modular forms; the modern theory of automorphic forms makes a similar use of congruence subgroups in more general arithmetic groups.
Congruence subgroups of the modular groupEdit
The simplest interesting setting in which congruence subgroups can be studied is that of the modular group Template:Tmath.<ref>The modular group is usually defined to be the quotient Template:Tmath, here we will rather use <math>\mathrm{SL}_2(\Z)</math> to make things simpler, but the theory is almost the same.</ref>
Principal congruence subgroupsEdit
If <math>n \geqslant 1</math> is an integer there is a homomorphism <math>\pi_n: \mathrm{SL}_2(\Z) \to \mathrm{SL}_2(\Z /n\Z)</math> induced by the reduction modulo <math>n</math> morphism Template:Tmath. The principal congruence subgroup of level <math>n</math> in <math>\Gamma = \mathrm{SL}_2(\Z)</math> is the kernel of Template:Tmath, and it is usually denoted Template:Tmath. Explicitly it is described as follows:
- <math> \Gamma(n) = \left\{ \begin{pmatrix} a & b \\ c & d \end{pmatrix} \in \mathrm{SL}_2(\Z) : a, d \equiv 1 \pmod n, \quad b, c \equiv 0 \pmod n \right\} </math>
This definition immediately implies that <math>\Gamma(n)</math> is a normal subgroup of finite index in Template:Tmath. The strong approximation theorem (in this case an easy consequence of the Chinese remainder theorem) implies that <math>\pi_n</math> is surjective, so that the quotient <math>\Gamma /\Gamma(n)</math> is isomorphic to Template:Tmath. Computing the order of this finite group yields the following formula for the index:
- <math> [\Gamma : \Gamma(n)] = n^3 \cdot \prod_{p \mid n} \left( 1 - \frac 1 {p^2} \right) </math>
where the product is taken over all prime numbers dividing Template:Tmath.
If <math>n \geqslant 3</math> then the restriction of <math>\pi_n</math> to any finite subgroup of <math>\Gamma</math> is injective. This implies the following result:
- If <math>n\geqslant 3</math> then the principal congruence subgroups <math>\Gamma(n)</math> are torsion-free.
The group <math>\Gamma(2)</math> contains <math>-\operatorname{Id}</math> and is not torsion-free. On the other hand, its image in <math>\operatorname{PSL}_2(\Z)</math> is torsion-free, and the quotient of the hyperbolic plane by this subgroup is a sphere with three cusps.
Definition of a congruence subgroupEdit
A subgroup <math>H</math> in <math>\Gamma = \mathrm{SL}_2(\Z)</math> is called a congruence subgroup if there exists <math>n \geqslant 1</math> such that <math>H</math> contains the principal congruence subgroup Template:Tmath. The level <math>l</math> of <math>H</math> is then the smallest such Template:Tmath.
From this definition it follows that:
- Congruence subgroups are of finite index in Template:Tmath;
- The congruence subgroups of level <math>\ell</math> are in one-to-one correspondence with the subgroups of Template:Tmath.
ExamplesEdit
The subgroup Template:Tmath, sometimes called the Hecke congruence subgroup of level Template:Tmath, is defined as the preimage by <math>\pi_n</math> of the group of upper triangular matrices. That is,
- <math> \Gamma_0(n) = \left\{ \begin{pmatrix} a & b \\ c & d \end{pmatrix} \in \Gamma : c \equiv 0 \pmod n \right\}. </math>
The index is given by the formula:
- <math> [\Gamma : \Gamma_0(n)] = n \cdot \prod_{p | n} \left( 1 + \frac 1 p \right) </math>
where the product is taken over all prime numbers dividing Template:Tmath. If <math>p</math> is prime then <math>\Gamma/\Gamma_0(p)</math> is in natural bijection with the projective line over the finite field Template:Tmath, and explicit representatives for the (left or right) cosets of <math>\Gamma_0(p)</math> in <math>\Gamma</math> are the following matrices:
- <math> \operatorname{Id}, \begin{pmatrix} 1 & 0 \\ 1 & 1 \end{pmatrix}, \ldots, \begin{pmatrix} 1 & 0 \\ p-1 & 1 \end{pmatrix}, \begin{pmatrix} 0 & -1 \\ 1 & 0 \end{pmatrix}. </math>
The subgroups <math>\Gamma_0(n)</math> are never torsion-free as they always contain the matrix Template:Tmath. There are infinitely many <math> n </math> such that the image of <math>\Gamma_0(n)</math> in <math>\mathrm{PSL}_2(\Z )</math> also contains torsion elements.
The subgroup <math>\Gamma_1(n)</math> is the preimage of the subgroup of unipotent matrices:
- <math> \Gamma_1(n) = \left\{ \begin{pmatrix} a & b \\ c & d \end{pmatrix} \in \Gamma : a, d \equiv 1 \pmod n, c \equiv 0 \pmod n \right\}. </math>
Their indices are given by the formula:
- <math> [\Gamma : \Gamma_1(n)] = n^2 \cdot \prod_{p | n} \left( 1 - \frac 1 {p^2} \right) </math>
The theta subgroup <math>\Lambda</math> is the congruence subgroup of <math>\Gamma</math> defined as the preimage of the cyclic group of order two generated by <math>\left ( \begin{smallmatrix} 0 & -1 \\1 & 0 \end{smallmatrix} \right ) \in \mathrm{SL}_2(\Z/2\Z )</math>. It is of index 3 and is explicitly described by:<ref>Template:Cite book</ref>
- <math> \Lambda = \left\{ \begin{pmatrix} a & b \\ c & d \end{pmatrix} \in \Gamma : ac \equiv 0 \pmod 2, bd \equiv 0 \pmod 2 \right\}.</math>
These subgroups satisfy the following inclusions: Template:Tmath, as well as Template:Tmath.
Properties of congruence subgroupsEdit
The congruence subgroups of the modular group and the associated Riemann surfaces are distinguished by some particularly nice geometric and topological properties. Here is a sample:
- There are only finitely many congruence covers of the modular surface that have genus zero;<ref>Template:Cite journal</ref>
- (Selberg's 3/16 theorem) If <math>f</math> is a nonconstant eigenfunction of the Laplace-Beltrami operator on a congruence cover of the modular surface with eigenvalue <math>\lambda</math> then Template:Tmath.
There is also a collection of distinguished operators called Hecke operators on smooth functions on congruence covers, which commute with each other and with the Laplace–Beltrami operator and are diagonalisable in each eigenspace of the latter. Their common eigenfunctions are a fundamental example of automorphic forms. Other automorphic forms associated to these congruence subgroups are the holomorphic modular forms, which can be interpreted as cohomology classes on the associated Riemann surfaces via the Eichler-Shimura isomorphism.
Normalisers of Hecke congruence subgroupsEdit
The normalizer <math>\Gamma_0(p)^+</math> of <math>\Gamma_0(p)</math> in <math>\mathrm{SL}_2(\R)</math> has been investigated; one result from the 1970s, due to Jean-Pierre Serre, Andrew Ogg and John G. Thompson is that the corresponding modular curve (the Riemann surface resulting from taking the quotient of the hyperbolic plane by Template:Tmath) has genus zero (i.e., the modular curve is a Riemann sphere) if and only if Template:Tmath is 2, 3, 5, 7, 11, 13, 17, 19, 23, 29, 31, 41, 47, 59, or 71. When Ogg later heard about the monster group, he noticed that these were precisely the prime factors of the size of Template:Tmath, he wrote up a paper offering a bottle of Jack Daniel's whiskey to anyone who could explain this fact – this was a starting point for the theory of monstrous moonshine, which explains deep connections between modular function theory and the monster group.
In arithmetic groupsEdit
Arithmetic groupsEdit
The notion of an arithmetic group is a vast generalisation based upon the fundamental example of Template:Tmath. In general, to give a definition one needs a semisimple algebraic group <math>\mathbf G</math> defined over <math>\Q</math> and a faithful representation Template:Tmath, also defined over Template:Tmath, from <math>\mathbf G</math> into Template:Tmath; then an arithmetic group in <math>\mathbf G(\Q)</math> is any group <math>\Gamma \subset \mathbf G(\Q)</math> that is of finite index in the stabiliser of a finite-index sub-lattice in Template:Tmath.
Congruence subgroupsEdit
Let <math>\Gamma</math> be an arithmetic group: for simplicity it is better to suppose that Template:Tmath. As in the case of <math>\mathrm{SL}_2(\Z)</math> there are reduction morphisms Template:Tmath. We can define a principal congruence subgroup of <math>\Gamma</math> to be the kernel of <math>\pi_n</math> (which may a priori depend on the representation Template:Tmath), and a congruence subgroup of <math>\Gamma</math> to be any subgroup that contains a principal congruence subgroup (a notion that does not depend on a representation). They are subgroups of finite index that correspond to the subgroups of the finite groups Template:Tmath, and the level is defined.
ExamplesEdit
The principal congruence subgroups of <math>\mathrm{SL}_d(\Z )</math> are the subgroups <math>\Gamma(n)</math> given by:
- <math>\Gamma(n) = \left\{(a_{ij}) \in \mathrm{SL}_d(\Z ): \forall i \, a_{ii} \equiv 1 \pmod n, \, \forall i \neq j \, a_{ij} \equiv 0 \pmod n \right\} </math>
the congruence subgroups then correspond to the subgroups of <math>\mathrm{SL}_d(\Z/n\Z )</math>.
Another example of arithmetic group is given by the groups <math>\mathrm{SL}_2(O)</math> where <math>O</math> is the ring of integers in a number field, for example Template:Tmath. Then if <math>\mathfrak p</math> is a prime ideal dividing a rational prime <math>p</math> the subgroups <math>\Gamma(\mathfrak p)</math> that is the kernel of the reduction map mod <math>\mathfrak p</math> is a congruence subgroup since it contains the principal congruence subgroup defined by reduction modulo Template:Tmath.
Yet another arithmetic group is the Siegel modular groups Template:Tmath, defined by:
- <math>\mathrm{Sp}_{2g}(\Z) = \left\{ \gamma \in \mathrm{GL}_{2g}(\Z) : \ \gamma^{\mathrm{T}} \begin{pmatrix} 0 & I_g \\ -I_g & 0 \end{pmatrix} \gamma= \begin{pmatrix} 0 & I_g \\ -I_g & 0 \end{pmatrix} \right\}.</math>
Note that if <math>g = 1</math> then Template:Tmath. The theta subgroup <math>\Gamma_{\vartheta}^{(n)}</math> of <math>\mathrm{Sp}_{2g}(\Z)</math> is the set of all <math>\left ( \begin{smallmatrix} A & B \\ C & D \end{smallmatrix}\right ) \in \mathrm{Sp}_{2g}(\Z)</math> such that both <math>AB^\top</math> and <math>CD^\top</math> have even diagonal entries.<ref>Template:Cite journal</ref>
Property (τ)Edit
The family of congruence subgroups in a given arithmetic group <math>\Gamma</math> always has property (τ) of Lubotzky–Zimmer.<ref>Template:Cite journal</ref> This can be taken to mean that the Cheeger constant of the family of their Schreier coset graphs (with respect to a fixed generating set for Template:Tmath) is uniformly bounded away from zero, in other words they are a family of expander graphs. There is also a representation-theoretical interpretation: if <math>\Gamma</math> is a lattice in a Lie group Template:Tmath then property (τ) is equivalent to the non-trivial unitary representations of Template:Tmath occurring in the spaces <math>L^2(G/\Gamma)</math> being bounded away from the trivial representation (in the Fell topology on the unitary dual of Template:Tmath). Property (τ) is a weakening of Kazhdan's property (T) which implies that the family of all finite-index subgroups has property (τ).
In S-arithmetic groupsEdit
If <math>\mathbf G</math> is a <math>\Q </math>-group and <math>S = \{p_1,\ldots, p_r\}</math> is a finite set of primes, an <math>S</math>-arithmetic subgroup of <math>\mathbf G(\Q )</math> is defined as an arithmetic subgroup but using <math>\Z[1/p_1,\ldots, 1/p_r])</math> instead of Template:Tmath. The fundamental example is Template:Tmath.
Let <math>\Gamma_S</math> be an <math>S</math>-arithmetic group in an algebraic group Template:Tmath. If <math>n</math> is an integer not divisible by any prime in Template:Tmath, then all primes <math>p_i</math> are invertible modulo <math>n</math> and it follows that there is a morphism Template:Tmath. Thus it is possible to define congruence subgroups in Template:Tmath, whose level is always coprime to all primes in Template:Tmath.
The congruence subgroup problemEdit
Finite-index subgroups in SL2(Z)Edit
Congruence subgroups in <math>\Gamma = \mathrm{SL}_2(\Z)</math> are finite-index subgroups: it is natural to ask whether they account for all finite-index subgroups in Template:Tmath. The answer is a resounding "no". This fact was already known to Felix Klein and there are many ways to exhibit many non-congruence finite-index subgroups. For example:
- The simple group in the composition series of a quotient Template:Tmath, where <math>\Gamma'</math> is a normal congruence subgroup, must be a simple group of Lie type (or cyclic), in fact one of the groups <math>\mathrm{SL}_2(\mathbb F_p)</math> for a prime Template:Tmath. But for every <math>m</math> there are finite-index subgroups <math>\Gamma' \subset \Gamma</math> such that <math>\Gamma / \Gamma'</math> is isomorphic to the alternating group <math>A_m</math> (for example <math>\Gamma(2)</math> surjects on any group with two generators, in particular on all alternating groups, and the kernels of these morphisms give an example). These groups thus must be non-congruence.
- There is a surjection Template:Tmath; for <math>m</math> large enough the kernel of <math>\Gamma(2) \to \Z \to \Z/m\Z </math> must be non-congruence (one way to see this is that the Cheeger constant of the Schreier graph goes to 0; there is also a simple algebraic proof in the spirit of the previous item).
- The number <math>c_N</math> of congruence subgroups in <math>\Gamma</math> of index <math>N</math> satisfies Template:Tmath. On the other hand, the number <math>a_N</math> of finite index subgroups of index <math>N</math> in <math>\Gamma</math> satisfies Template:Tmath, so most subgroups of finite index must be non-congruence.Template:Sfn
Congruence kernelEdit
One can ask the same question for any arithmetic group as for the modular group:
- Naïve congruence subgroup problem: Given an arithmetic group, are all of its finite-index subgroups congruence subgroups?
This problem can have a positive solution: its origin is in the work of Hyman Bass, Jean-Pierre Serre and John Milnor, and Jens Mennicke who proved that, in contrast to the case of <math>\mathrm{SL}_2(\Z)</math>, when <math>n \geqslant 3</math> all finite-index subgroups in <math>\mathrm{SL}_n(\Z)</math> are congruence subgroups. The solution by Bass–Milnor–Serre involved an aspect of algebraic number theory linked to K-theory.<ref>Template:Citation (Erratum)</ref> On the other hand, the work of Serre on <math>\mathrm{SL}_2</math> over number fields shows that in some cases the answer to the naïve question is "no" while a slight relaxation of the problem has a positive answer.<ref>Template:Cite journal</ref>
This new problem is better stated in terms of certain compact topological groups associated to an arithmetic group Template:Tmath. There is a topology on <math>\Gamma</math> for which a base of neighbourhoods of the trivial subgroup is the set of subgroups of finite index (the profinite topology); and there is another topology defined in the same way using only congruence subgroups. The profinite topology gives rise to a completion Template:Tmath of Template:Tmath, while the "congruence" topology gives rise to another completion Template:Tmath. Both are profinite groups and there is a natural surjective morphism <math>\widehat \Gamma \to \overline \Gamma</math> (intuitively, there are fewer conditions for a Cauchy sequence to comply with in the congruence topology than in the profinite topology).Template:SfnTemplate:Sfn The congruence kernel <math>C(\Gamma)</math> is the kernel of this morphism, and the congruence subgroup problem stated above amounts to whether <math>C(\Gamma)</math> is trivial. The weakening of the conclusion then leads to the following problem.
- Congruence subgroup problem: Is the congruence kernel <math>C(\Gamma)</math> finite?
When the problem has a positive solution one says that <math>\Gamma</math> has the congruence subgroup property. A conjecture generally attributed to Serre states that an irreducible arithmetic lattice in a semisimple Lie group <math>G</math> has the congruence subgroup property if and only if the real rank of <math>G</math> is at least 2; for example, lattices in <math>\mathrm{SL}_3(\R)</math> should always have the property.
Negative solutionsEdit
Serre's conjecture states that a lattice in a Lie group of rank one should not have the congruence subgroup property. There are three families of such groups: the orthogonal groups Template:Tmath, the unitary groups <math>\mathrm{SU}(d, 1), d \geqslant 2</math> and the groups <math>\mathrm{Sp}(d,1), d \geqslant 2</math> (the isometry groups of a sesquilinear form over the Hamilton quaternions), plus the exceptional group <math>F_4^{-20}</math> (see List of simple Lie groups). The current status of the congruence subgroup problem is as follows:
- It is known to have a negative solution (confirming the conjecture) for all groups <math>\mathrm{SO}(d,1)</math> with Template:Tmath. The proof uses the same argument as 2. in the case of <math>\mathrm{SL}_2(\Z)</math>: in the general case it is much harder to construct a surjection to Template:Tmath, the proof is not at all uniform for all cases and fails for some lattices in dimension 7 due to the phenomenon of triality.Template:Sfn<ref>Template:Cite journal</ref> In dimensions 2 and 3 and for some lattices in higher dimensions argument 1 and 3 also apply.
- It is known for many lattices in <math>\mathrm{SU}(d,1)</math>, but not all (again using a generalisation of argument 2).<ref>Template:Cite journal</ref>
- It is completely open in all remaining cases.
Positive solutionsEdit
In many situations where the congruence subgroup problem is expected to have a positive solution it has been proven that this is indeed the case. Here is a list of algebraic groups such that the congruence subgroup property is known to hold for the associated arithmetic lattices, in case the rank of the associated Lie group (or more generally the sum of the rank of the real and Template:Tmath-adic factors in the case of Template:Tmath-arithmetic groups) is at least 2:Template:Sfn
- Any non-anisotropic group (this includes the cases dealt with by Bass–Milnor–Serre, as well as <math>\mathrm{SO}(p,q)</math> is Template:Tmath, and many others);
- Any group of type not <math>A_n</math> (for example all anisotropic forms of symplectic or orthogonal groups of real rank Template:Tmath);
- Unitary groups of hermitian forms.
The cases of inner and outer forms of type <math>A_n</math> are still open. The algebraic groups in the case of inner forms of type <math>A_n</math> are those associated to the unit groups in central simple division algebras; for example the congruence subgroup property is not known for lattices in <math>\mathrm{SL}_3(\R)</math> or <math>\mathrm{SL}_2(\R) \times \mathrm{SL}_2(\R)</math> with compact quotient.<ref>Template:Cite journal</ref>
Congruence groups and adèle groupsEdit
The ring of adeles <math>\mathbb A</math> is the restricted product of all completions of Template:Tmath, i.e.
- <math>\mathbb A = \R \times \prod_p' \Q _p</math>
where the product is over the set <math>\mathcal P</math> of all primes, <math>\Q _p</math> is the field of p-adic numbers and an element <math>(x, (x_p)_{p \in \mathcal P})</math> belongs to the restricted product if and only if for almost all primes Template:Tmath, <math>x_p</math> belongs to the subring <math>\mathbb Z_p</math> of p-adic integers.
Given any algebraic group <math>\mathbf G</math> over <math>\Q </math> the adelic algebraic group <math>\mathbf G(\mathbb A)</math> is well-defined. It can be endowed with a canonical topology, which in the case where <math>\mathbf G</math> is a linear algebraic group is the topology as a subset of Template:Tmath. The finite adèles <math>\mathbb A_f</math> are the restricted product of all non-archimedean completions (all p-adic fields).
If <math>\Gamma \subset \mathbf G(\Q )</math> is an arithmetic group then its congruence subgroups are characterised by the following property: <math>H \subset \Gamma</math> is a congruence subgroup if and only if its closure <math>\overline H \subset \mathbf G(\mathbb A_f)</math> is a compact-open subgroup (compactness is automatic) and Template:Tmath. In general the group <math>\Gamma \cap \overline H</math> is equal to the congruence closure of <math>H</math> in Template:Tmath, and the congruence topology on <math>\Gamma</math> is the induced topology as a subgroup of Template:Tmath, in particular the congruence completion <math>\overline \Gamma</math> is its closure in that group. These remarks are also valid for Template:Tmath-arithmetic subgroups, replacing the ring of finite adèles with the restricted product over all primes not in Template:Tmath.
More generally one can define what it means for a subgroup <math>\Gamma \subset \mathbf G(\Q)</math> to be a congruence subgroup without explicit reference to a fixed arithmetic subgroup, by asking that it be equal to its congruence closure Template:Tmath. Thus it becomes possible to study all congruence subgroups at once by looking at the discrete subgroup Template:Tmath. This is especially convenient in the theory of automorphic forms: for example all modern treatments of the Arthur–Selberg trace formula are done in this adélic setting.