Multiplicity-one theorem

This article has multiple issues. Please help improve it or discuss these issues on the talk page. (Learn how and when to remove these messages) No issues specified. Please specify issues, or remove this template. (Learn how and when to remove this message)

In the theory of automorphic representations, a multiplicity-one theorem is a result about the representation theory of an adelic reductive algebraic group.

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

1. f(γg) = f(g) for all γ ∈ G(K)
2. f(gz) = f(g)ω(z) for all z ∈ Z(A)
3. ${\displaystyle \int _{Z(\mathbf {A} )G(K)\backslash G(\mathbf {A} )}|f(g)|^{2}dg<\infty }$
4. ${\displaystyle \int _{U(K)\backslash U(\mathbf {A} )}f(ug)du=0}$ 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). This space decomposes into a direct sum of Hilbert spaces

${\displaystyle L_{0}^{2}(G(K)\backslash G(\mathbf {A} ),\omega )={\hat {\bigoplus }}_{(\pi ,V_{\pi })}m_{\pi }V_{\pi }}$

where the sum is over irreducible subrepresentations and m_{π are non-negative integers.}

The group of adelic points of G, G(A), is said to satisfy the multiplicity-one property if any smooth irreducible admissible representation of G(A) occurs with multiplicity at most one in the space of cusp forms of central character ω, i.e. m_π is 0 or 1 for all such π.

The fact that the general linear group, GL(n), has the multiplicity-one property was proved by (Jacquet & Langlands 1970) for n = 2 and independently by (Piatetski-Shapiro 1979) and (Shalika 1974) for n > 2 using the uniqueness of the Whittaker model. Multiplicity-one also holds for SL(2), but not for SL(n) for n > 2 (Blasius 1994).

• Blasius, Don (1994), "On multiplicities for SL(n)", Israel Journal of Mathematics, 88: 237–251
• Cogdell, James (2004), Lecturs on L-functions, converse theorems, and functoriality for GL(n), pp. 1–105, ISBN 978-0-821-83516-6
• Jacquet, Hervé; Langlands, Robert (1970), Automorphic forms on GL(2), Lecture Notes in Mathematics, vol. 114, Springer-Verlage
• Piatetski-Shapiro, I.I. (1979), Multiplicity one theorems, Proceedings of the Symposium in Pure Mathematics, vol. 33-I, AMS, pp. 209–212
• Shalika, Joseph (1974), "The multiplicity one theorem for GL(n)", Annals of Mathematics, 100: 171–193