Vector valued polynomials, exponential polynomials and vector valued harmonic analysis

Abstract

Let G be a topological Abelian semigroup with unit, let E be a Banach space, and let C(G,E) denote the set of continuous functions f G E. A function f∈ C(G,E) is a generalized polynomial, if there is an n 0 such that h1 … hn+1 f=0 for every h1 ,… , hn+1 ∈ G, where h is the difference operator. We say that f∈ C(G,E) is a polynomial, if it is a generalized polynomial, and the linear span of its translates is of finite dimension; f is a w-polynomial, if u f is a polynomial for every u∈ E*, and f is a local polynomial, if it is a polynomial on every finitely generated subsemigroup. We show that each of the classes of polynomials, w-polynomials, generalized polynomials, local polynomials is contained in the next class. If G is an Abelian group and has a dense subgroup with finite torsion free rank, then these classes coincide. We introduce the classes of exponential polynomials and w-expo\-nential polynomials as well, establish their representations and connection with polynomials and w-polynomials. We also investigate spectral synthesis and analysis in the class C(G,E). It is known that if G is a compact Abelian group and E is a Banach space, then spectral synthesis holds in C(G,E). On the other hand, we show that if G is an infinite and discrete Abelian group and E is a Banach space of infinite dimension, then even spectral analysis fails in C(G,E). If, however, G is discrete, has finite torsion free rank and if E is a Banach space of finite dimension, then spectral synthesis holds in C(G,E).