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In mathematics, the notion of factor of automorphy arises for a group acting on a complex-analytic manifold. Suppose a group G acts on a complex-analytic manifold X. Then, G also acts on the space of holomorphic functions from X {\displaystyle X} X to the complex numbers. A function f is termed an automorphic form if the following holds:

\( f(g.x)=j_{g}(x)f(x) \)

where \( j_{g}(x) \) is an everywhere nonzero holomorphic function. Equivalently, an automorphic form is a function whose divisor is invariant under the action of G.

The factor of automorphy for the automorphic form f is the function j. An automorphic function is an automorphic form for which j is the identity.

Some facts about factors of automorphy:

Every factor of automorphy is a cocycle for the action of G {\displaystyle G} G on the multiplicative group of everywhere nonzero holomorphic functions.
The factor of automorphy is a coboundary if and only if it arises from an everywhere nonzero automorphic form.
For a given factor of automorphy, the space of automorphic forms is a vector space.
The pointwise product of two automorphic forms is an automorphic form corresponding to the product of the corresponding factors of automorphy.

Relation between factors of automorphy and other notions:

Let \( \Gamma\) be a lattice in a Lie group G. Then, a factor of automorphy for Γ {\displaystyle \Gamma } \Gamma corresponds to a line bundle on the quotient group \( G/\Gamma \) . Further, the automorphic forms for a given factor of automorphy correspond to sections of the corresponding line bundle.

The specific case of \( \Gamma \) a subgroup of SL(2, R), acting on the upper half-plane, is treated in the article on automorphic factors.
References
A.N. Andrianov, A.N. Parshin (2001) [1994], "Automorphic Function", Encyclopedia of Mathematics, EMS Presss (The commentary at the end defines automorphic factors in modern geometrical language)
A.N. Parshin (2001) [1994], "Automorphic Form", Encyclopedia of Mathematics, EMS Presss

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