Cuspidal representation

In number theory, cuspidal representations are certain representations of algebraic groups that occur discretely in $L 2$ spaces. The term cuspidal is derived, at a certain distance, from the cusp forms of classical modular form theory. In the contemporary formulation of automorphic representations, representations take the place of holomorphic functions; these representations may be of adelic algebraic groups.

When the group is the general linear group $\operatorname{GL}_2$ , the cuspidal representations are directly related to cusp forms and Maass forms. For the case of cusp forms, each Hecke eigenform (newform) corresponds to a cuspidal representation.

Formulation

Let G be a reductive algebraic group over a number field K and let A denote the adeles of K. Let Z denote the centre of G and let ω be a continuous unitary character from Z(K)\Z(A)^× to C^×. Fix a Haar measure on G(A) and let L²₀(G(K)\G(A), ω) denote the Hilbert space of measurable complex-valued functions, f, on G(A) satisfying

f(γg) = f(g) for all γ ∈ G(K)
f(gz) = f(g)ω(z) for all z ∈ Z(A)
$\int_{Z(\mathbf{A})G(K)\backslash G(\mathbf{A})}|f(g)|^2\,dg < \infty$
$\int_{U(K)\backslash U(\mathbf{A})}f(ug)\,du=0$ for all unipotent radicals, U, of all proper parabolic subgroups of G(A).

This is called the space of cusp forms with central character ω on G(A). A function occurring in such a space is called a cuspidal function. This space is unitary representation of the group G(A) where the action of g ∈ G(A) on a cuspidal function f is given by

$(g\cdot f)(x)=f(xg).$

The space of cusp forms with central character ω decomposes into a direct sum of Hilbert spaces

$L^2_0(G(K)\backslash G(\mathbf{A}),\omega)=\hat{\bigoplus}_{(\pi,V_\pi)}m_\pi V_\pi$

where the sum is over irreducible subrepresentations of L²₀(G(K)\G(A), ω) and m_π are positive integers (i.e. each irreducible subrepresentation occurs with finite multiplicity). A cuspidal representation of G(A) is such a subrepresentation (π, V) for some ω.

The groups for which the multiplicities m_π all equal one are said to have the multiplicity-one property.

References

James W. Cogdell, Henry Hyeongsin Kim, Maruti Ram Murty. Lectures on Automorphic L-functions (2004), Chapter 5.

Categories:

Representation theory of algebraic groups

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