On some spaces of functions infinitely differentiable in an open set in \(\mathbb R^{p}\) (Q881192)

Let \( G \) be an open subset of \( {\mathbb R}^p \) and let \( B^\infty(G) \) be the space of complex-valued \( C^\infty \) functions on \( G \) which are uniformly bounded on \( G \), together with all their derivatives. Denote by \( BC^\infty(G)\) the subspace of \( B^\infty(G) \) consisting of all the elements of \( B^\infty(G) \) which are uniformly continuous in \( G\), together with all their derivatives. The author states several conditions for the equality \( B^\infty(G)=BC^\infty(G) \). He also studies properties of extendability of the functions of \( BC^\infty(G) \) to functions of \( BC^\infty({\mathbb R}^p) \) and relates these properties to the existence of suitable representations of the elements of \( BC^\infty(G) \) as absolutely convergent series of exponentials with purely imaginary exponents.