Complementary series (of representations)

The family of irreducible continuous unitary representations of a locally compact group $G$, the non-zero matrix elements of which cannot be approximated by finite linear combinations of matrix elements of the regular representation of $G$ in the topology of uniform convergence on compact sets in $G$. The complementary series of the group $G$ is non-empty if and only if $G$ is not amenable, i.e. if the space $L_\infty(G)$ contains no non-trivial left-invariant mean [2]. A connected Lie group $G$ has a non-empty complementary series if and only if the semi-simple quotient group of $G$ by its maximal connected solvable normal subgroup is non-compact (cf. Levi–Mal'tsev decomposition). A complementary series was first discovered for the complex classical groups [1]. At the time of writing (1987) complementary series have been fully described only for certain locally compact groups. Certain problems in number theory (see, for example, [5]) are equivalent to problems in the theory of representations connected with the complementary series of adèle groups of linear algebraic groups.

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In the theory of semi-simple Lie groups the notion of a complementary series representation often is introduced in a different fashion, viz. as a generalized principal series representation (cf. Continuous series of representations) that is (infinitesimally) unitary.

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