Noncoherent uniform algebras in Cn

Abstract

Let D= D be the closed unit disk in C and Bn= Bn the closed unit ball in Cn. For a compact subset K in Cn with nonempty interior, let A(K) be the uniform algebra of all complex-valued continuous functions on K that are holomorphic in the interior of K. We give short and non-technical proofs of the known facts that A( Dn) and A( Bn) are noncoherent rings. Using, additionally, Earl's interpolation theorem in the unit disk and the existence of peak-functions, we also establish with the same method the new result that A(K) is not coherent. As special cases we obtain Hickel's theorems on the noncoherence of A(), where runs through a certain class of pseudoconvex domains in Cn, results that were obtained with deep and complicated methods. Finally, using a refinement of the interpolation theorem we show that no uniformly closed subalgebra A of C(K) with P(K)⊂eq A⊂eq C(K) is coherent provided the polynomial convex hull of K has no isolated points.