Orthogonally additive holomorphic maps between C*-algebras

Abstract

Let A,B be C*-algebras, BA(0;r) the open ball in A centered at 0 with radius r>0, and H:BA(0;r) B an orthogonally additive holomorphic map. If H is zero product preserving on positive elements in BA(0;r), we show, in the commutative case when A=C0(X) and B=C0(Y), that there exist weight functions hn's and a symbol map : Y X such that H(f)=Σn≥1 hn (f)n, ∀ f∈ BC0(X)(0;r). In the general case, we show that if H is also conformal then there exist central multipliers hn's of B and a surjective Jordan isomorphism J: A B such that H(a) = Σn≥1 hn J(a)n, ∀ a∈ BA(0;r). If, in addition, H is zero product preserving on the whole BA(0;r), then J is an algebra isomorphism. %Similar conclusions hold for orthogonally additive n-homogeneous polynomials which are n-isometries.