Holomorphic injective extensions of functions in P(K) and algebra generators

Abstract

We present necessary and sufficient conditions on planar compacta K and continuous functions f on K in order that f generates the algebras P(K), R(K), A(K) or C(K). We also unveil quite surprisingly simple examples of non-polynomial convex compacta K⊂eq C and f∈ P(K) with the property that f ∈ P(K) is a homeomorphism, but for which f-1 P(f(K)). As a consequence, such functions do not admit injective holomorphic extensions to the interior of the polynomial convex hull K. On the other hand, it will be shown that the restriction f*|G of the Gelfand-transform f* of an injective function f∈ P(K) is injective on every regular, bounded complementary component G of K. A necessary and sufficient condition in terms of the behaviour of f on the outer boundary of K is given in order f admits a holomorphic injective extension to K. We also include some results on the existence of continuous logarithms on punctured compacta containing the origin in their boundary.