Multiplicative spectral functions on some Banach function algebras

Abstract

In this paper, we study multiplicative functions A C on a natural Banach function algebra A on a compact Hausdorff space X, such that (f)∈ σ(f) for all f∈ A. It is shown that for certain natural Banach function algebras A, either () is a maximal ideal of A or 1∈ span( ker()) (that is 1=f1+f2+·s fn for some f1,..., fn ∈ ker()). Then we investigate for the linearity of in either of cases that is continuous or 1 span( ker(). We show that, for some natural Banach function algebras A, in either of these cases, there exists a point x0∈ X such that (f)=f(x0) for some family of functions f∈ A (including those functions f∈ A that f∈ A). In particular, such a multiplicative spectral function on some Banach algebras including C(X), Lipschitz algebras, Banach algebras of absolutely continuous functions on [0,1] and C1([0,1]) is linear and hence it is a character.