Petersson inner product explained

In mathematics the Petersson inner product is an inner product defined on the space of entire modular forms. It was introduced by the German mathematician Hans Petersson.

Definition

Let

M_k

be the space of entire modular forms of weight

and

S_k

the space of cusp forms.

The mapping

\langle ⋅ , ⋅ \rangle:M_k x S_k → C

\langlef,g\rangle:=\int_Ff(\tau)\overline{g(\tau)}(\operatorname{Im}\tau)^kd\nu(\tau)

is called Petersson inner product, where

F=\left\{\tau\inH:\left|\operatorname{Re}\tau\right|\leq

	1
	2

,\left|\tau\right|\geq1\right\}

\Gamma

and for

\tau=x+iy

d\nu(\tau)=y^-2dxdy

is the hyperbolic volume form.

The integral is absolutely convergent and the Petersson inner product is a positive definite Hermitian form.

T_n

, and for forms

f,g

of level

\Gamma₀

, we have:

\langleT_nf,g\rangle=\langlef,T_ng\rangle

This can be used to show that the space of cusp forms of level

\Gamma₀

has an orthonormal basis consisting of simultaneous eigenfunctions for the Hecke operators and the Fourier coefficients of these forms are all real.

T.M. Apostol, Modular Functions and Dirichlet Series in Number Theory, Springer Verlag Berlin Heidelberg New York 1990,
M. Koecher, A. Krieg, Elliptische Funktionen und Modulformen, Springer Verlag Berlin Heidelberg New York 1998,
S. Lang, Introduction to Modular Forms, Springer Verlag Berlin Heidelberg New York 2001,