Vector-valued spectra of Banach algebra valued continuous functions

Abstract

Given a compact space X, a commutative Banach algebra A, and an A-valued function algebra A on X, the notions of vector-valued spectrum of functions f∈A are discussed. The A-valued spectrum SPA(f) of every f∈A is defined in such a way that f(X) ⊂ SPA(f). Utilizing the A-characters introduced in (M. Abtahi, Vector-valued characters on vector-valued function algebras, arXiv:1509.09215 [math.FA]), it is proved that SPA(f) = \(f): is an A-character of A\. For the so-called natural A-valued function algebras, such as C(X,A) and Lip(X,A), we see that SPA(f)=f(X). When A = C, Banach A-valued function algebras reduce to Banach function algebras, A-characters reduce to characters, and A-valued spectrums reduce to usual spectrums.