Automorphic factor

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title: "Automorphic factor" type: doc version: 1 created: 2026-02-28 author: "Wikipedia contributors" status: active scope: public tags: ["modular-forms"] topic_path: "general/modular-forms" source: "https://en.wikipedia.org/wiki/Automorphic_factor" license: "CC BY-SA 4.0" wikipedia_page_id: 0 wikipedia_revision_id: 0

In mathematics, an automorphic factor is a certain type of analytic function, defined on subgroups of SL(2,R), appearing in the theory of modular forms. The general case, for general groups, is reviewed in the article 'factor of automorphy'.

Definition

An automorphic factor of weight k is a function \nu : \Gamma \times \mathbb{H} \to \Complex satisfying the four properties given below. Here, the notation \mathbb{H} and \Complex refer to the upper half-plane and the complex plane, respectively. The notation \Gamma is a subgroup of SL(2,R), such as, for example, a Fuchsian group. An element \gamma \in \Gamma is a 2×2 matrix \gamma = \begin{bmatrix}a&b \c & d\end{bmatrix} with a, b, c, d real numbers, satisfying ad−bc=1.

An automorphic factor must satisfy:

For a fixed \gamma\in\Gamma, the function \nu(\gamma,z) is a holomorphic function of z\in\mathbb{H}.
For all z\in\mathbb{H} and \gamma\in\Gamma, one has \vert\nu(\gamma,z)\vert = \vert cz + d\vert^k for a fixed real number k.
For all z\in\mathbb{H} and \gamma,\delta \in \Gamma, one has \nu(\gamma\delta, z) = \nu(\gamma,\delta z)\nu(\delta,z) Here, \delta z is the fractional linear transform of z by \delta.
If -I\in\Gamma, then for all z\in\mathbb{H} and \gamma \in \Gamma, one has \nu(-\gamma,z) = \nu(\gamma,z) Here, I denotes the identity matrix.

Properties

Every automorphic factor may be written as

:\nu(\gamma, z)=\upsilon(\gamma) (cz+d)^k

with :\vert\upsilon(\gamma)\vert = 1

The function \upsilon:\Gamma\to S^1 is called a multiplier system. Clearly,

:\upsilon(I)=1, while, if -I\in\Gamma, then

:\upsilon(-I)=e^{-i\pi k} which equals (-1)^k when k is an integer.

References

Robert Rankin, Modular Forms and Functions, (1977) Cambridge University Press . (Chapter 3 is entirely devoted to automorphic factors for the modular group.)

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