Orthogonally additive, orthogonality preserving, holomorphic mappings between C*-algebras

Abstract

We study holomorphic maps between C*-algebras A and B. When f:BA (0,) B is a holomorphic mapping whose Taylor series at zero is uniformly converging in some open unit ball U=BA(0,δ) and we assume that f is orthogonality preserving on Asa U, orthogonally additive on U and f(U) contains an invertible element in B, then there exist a sequence (hn) in B** and Jordan *-homomorphisms , : M(A) B** such that f(x) = Σn=1∞ hn (an)= Σn=1∞ (an) hn, uniformly in a∈ U. When B is abelian the hypothesis of B being unital and f(U) inv (B) ≠ can be relaxed to get the same statement.