Solvability on the Heisenberg group

We discuss the problem of solvability for the class of homogenoeus left-invariant operators g S, : on the Heisenberg group H n introduced by F.

In this paper we prove that cylinders of the form R = S R × , where S R is the sphere z ∈ n z = R , are injectivity sets for the spherical mean value operator on the Heisenberg group H n in L p spaces. We prove this result as a consequence of a uniqueness theorem for the heat equation associated to

Irreducible representations of the convolution algebra M(H n ) of bounded regular complex Borel measures on the Heisenberg group H n are analyzed. For the Segal Bargmann representation \, the C\*-algebra generated by \[M(H n )] is just the C\*-algebra generated by Berezin Toeplitz operators with pos

## 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 A __g.o. space__ is a homogeneous Riemannian manifold __M__ = (__G/H, g__) on which every geodesic is an orbit of a one–parameter subgroup of the group __G__. (__G__ acts transitively on __M__ as a group of isometries.) Each g.o. space gives rise to certain rational maps called “geodesi