The Paley-Wiener space for the multitemporal wave equation

## 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

E. Damek, A. Hulanicki, and R. Penney (J. Funct. Anal., in press) studied a canonical system of differential equations (the Hua system) denoted HJK which is definable on any Ka hlerian manifold M. Functions annihilated by this system are called ``Hua-harmonic.'' In the case where M is a bounded homo

## Abstract We generalize the classical Paley–Wiener theorem to special types of connected, simply connected, nilpotent Lie groups: First we consider nilpotent Lie groups whose Lie algebra admits an ideal which is a polarization for a dense subset of generic linear forms on the Lie algebra. Then we

## Abstract We study the dispersive properties of the Schrödinger equation. Precisely, we look for estimates which give a control of the local regularity and decay at infinity __separately__. The Banach spaces that allow such a treatment are the Wiener amalgam spaces, and Strichartz‐type estimates

FREDHOLM'S alternative for the DIRICHLET problem generalized according to WIENER of the reduced wave equation By GUNTER ALBINUS in Berlin (Eingegangen am 15.8.1975) 0. Introduction. Let QcR" be a bounded region. The DIRICHLET problem ( A , 9, f ) for the LAPLACE operator in the region 9 with boundar