Spectral theory for commutative algebras of differential operators on Lie groups

The joint spectral theory of a system of pairwise commuting self-adjoint left-invariant differential operators L1, . . . , Ln on a connected Lie group G is studied, under the hypothesis that the algebra generated by them contains a “weighted subcoercive operator” of ter Elst and Robinson (1998) [52]. The joint spectrum of L1, . . . , Ln in every unitary representation of G is characterized as the set of the eigenvalues corresponding to a particular class of (generalized) joint eigenfunctions of positive type of L1, . . . , Ln. Connections with the theory of Gelfand pairs are established in the case L1, . . . , Ln generate the algebra of K-invariant left-invariant differential operators on G for some compact subgroup K of Aut(G). © 2011 Elsevier Inc. All rights reserved