Clarkson-Erd\"os-Schwartz Theorem on a Sector

Abstract

We prove a Clarkson-Erd\"os-Schwartz type theorem for the case of a closed sector in the plane. Concretely, we get some sufficient conditions for the incompleteness and minimality of a M\"untz system E()=zλn:n=0,1,... in the space Hα, where Hα=A(Iα), Iα=z∈C:| (z)|≤ α and |z|≤ 1 and A(K)=C(K) H(Int[K]) denotes the space of continuous functions on the compact set K which are analytic in the interior of K. Furthermore, we prove that, if span[E()] is not dense in Hα then all functions f∈ span[E()] can be analytically extended to the interior of the sector Iπ.