Poisson transform for the Heisenberg group and eigenfunctions of the sublaplacian

Suppose that K/U(n) is a compact Lie group acting on the (2n+1)-dimensional Heisenberg group H n . We say that (K, H n ) is a Gelfand pair if the convolution algebra L 1 K (H n ) of integrable K-invariant functions on H n is commutative. In this case, the Gelfand space 2(K, H n ) is equipped with th

## Abstract In this paper we prove a Tauberian type theorem for the space __L__ $ ^1 \_{\bf m} $(H~__n__~ ). This theorem gives sufficient conditions for a __L__ $ ^1 \_{\bf 0} $(H~__n__~ ) submodule __J__ ⊂ __L__ $ ^1 \_{\bf m} $(H~__n__~ ) to make up all of __L__ $ ^1 \_{\bf m} $(H~__n__~ ). As a

## Abstract The Paley‐Wiener space __PW__ (__G__) on a stratified Lie group __G__ is defined via the spectral decomposition of the associated sub‐Laplacian. In this paper, we show that functions in __PW__ (ℍ), where ℍ denotes the Heisenberg group, extend to an entire function on the complexificatio