Infinite-factorable holomorphic mappings on locally convex spaces (Q1103822)

We introduce the notion of holomorphic mappings of uniformly bounded A- type between locally convex spaces where A denotes any normed operator ideal in the sense of A. Pietsch. In this note we consider such holomorphic mappings for the operator ideals \(L_{\infty}\), \(S_{\infty}\) and \(K_{\infty}\), respectively, of all \(\infty\)- factorable, strongly \(\infty\)-factorable and \(\infty\)-compact operators.