On a Space of Infinitely Differentiable Functions on an Unbounded Convex Set in Rn Admitting Holomorphic Extension in Cn and its Dual

Abstract

We consider a space of infinitely smooth functions on an unbounded closed convex set in Rn. It is shown that each function of this space can be extended to an entire function in Cn satisfying some prescribed growth condition. Description of linear continuous functionals on this space in terms of their Fourier-Laplace transform is obtained. Also a variant of the Paley-Wiener-Schwartz theorem for tempered distributions is given it the paper.