Atkin–Lehner Theory

In mathematics, Atkin–Lehner theory is part of the theory of modular forms describing when they arise at a given integer ''level'' ''N'' in such a way that the theory of Hecke operators can be extended to higher levels.

Atkin–Lehner theory is based on the concept of a newform, which is a cusp form 'new' at a given ''level'' ''N'', where the levels are the nested congruence subgroups:
:$\Gamma_0(N) = \left\$
of the modular group, with ''N'' ordered by divisibility. That is, if ''M'' divides ''N'', Γ₀(''N'') is a subgroup of Γ₀(''M''). The oldforms for Γ₀(''N'') are those modular forms ''f(τ)'' of level ''N'' of the form ''g''(''d τ'') for modular forms ''g'' of level ''M'' with ''M'' a proper divisor of ''N'', where ''d'' divides ''N/M''. The newforms are defined as a vector subspace of the modular forms of level ''N'', complementary to the space spanned by the oldforms, i.e. the orthogonal space with respect to the Petersson inner product.

The Hecke operators, which act on the space of all cusp forms, preserve the subspace of newforms and are self-adjoint and commuting operators (with respect to the Petersson inner product) when restricted to this subspace. Therefore, the algebra of operators on newforms they generate is a finite-dimensional C*-algebra that is commutative; and by the spectral theory of such operators, there exists a basis for the space of newforms consisting of eigenforms for the full Hecke algebra.

Atkin–Lehner involutions

Consider a Hall divisor ''e'' of ''N'', which means that not only does ''e'' divide ''N'', but also ''e'' and ''N''/''e'' are relatively prime (often denoted ''e'', , ''N''). If ''N'' has ''s'' distinct prime divisors, there are 2^''s'' Hall divisors of ''N''; for example, if ''N'' = 360 = 2³⋅3²⋅5¹, the 8 Hall divisors of ''N'' are 1, 2³, 3², 5¹, 2³⋅3², 2³⋅5¹, 3²⋅5¹, and 2³⋅3²⋅5¹.

For each Hall divisor ''e'' of ''N'', choose an integral matrix ''W''_''e'' of the form
:$W_e = \beginae & b \\ cN & de \end$
with det ''W''_''e'' = ''e''. These matrices have the following properties:
* The elements ''W''_''e'' ''normalize'' Γ₀(''N''): that is, if ''A'' is in Γ₀(''N''), then ''W''_''e''''AW'' is in Γ₀(''N'').
* The matrix ''W'', which has determinant ''e''², can be written as ''eA'' where ''A'' is in Γ₀(''N''). We will be interested in operators on cusp forms coming from the action of ''W''_''e'' on Γ₀(''N'') by conjugation, under which both the scalar ''e'' and the matrix ''A'' act trivially. Therefore, the equality ''W'' = ''eA'' implies that the action of ''W''_''e'' squares to the identity; for this reason, the resulting operator is called an Atkin–Lehner involution.
* If ''e'' and ''f'' are both Hall divisors of ''N'', then W_''e'' and W_''f'' commute modulo Γ₀(''N''). Moreover, if we define ''g'' to be the Hall divisor ''g'' = ''ef''/(''e'',''f'')², their product is equal to W_''g'' modulo Γ₀(''N'').
* If we had chosen a different matrix ''W'' ′_''e'' instead of ''W''_''e'', it turns out that ''W''_''e'' ≡ ''W'' ′_''e'' modulo Γ₀(''N''), so ''W''_''e'' and ''W'' ′_''e'' would determine the same Atkin–Lehner involution.
We can summarize these properties as follows. Consider the subgroup of GL(2,Q) generated by Γ₀(''N'') together with the matrices ''W''_''e''; let Γ₀(''N'')⁺ denote its quotient by positive scalar matrices. Then Γ₀(''N'') is a normal subgroup of Γ₀(''N'')⁺ of index 2^''s'' (where ''s'' is the number of distinct prime factors of ''N''); the quotient group is isomorphic to (Z/2Z)^s and acts on the cusp forms via the Atkin–Lehner involutions.

References

*Mocanu, Andreea. (2019).
Atkin-Lehner Theory of Γ₁(m)-Modular Forms

*
* Koichiro Harada (2010) ''"Moonshine" of Finite Groups'', page 13, European Mathematical Society

{{DEFAULTSORT:Atkin-Lehner theory
Modular forms