Orthogonally additive and orthogonally multiplicative holomorphic functions of matrices

Abstract

Let H:Mm Mm be a holomorphic function of the algebra Mm of complex m× m matrices. Suppose that H is orthogonally additive and orthogonally multiplicative on self-adjoint elements. We show that either the range of H consists of zero trace elements, or there is a scalar sequence \λn\ and an invertible S in Mm such that H(x) =Σn≥ 1 λn S-1xnS, ∀ x ∈ Mm,%() or H(x) =Σn≥ 1 λn S-1(xt)nS, ∀ x ∈ Mm. Here, xt is the transpose of the matrix x. In the latter case, we always have the first representation form when H also preserves zero products. We also discuss the cases where the domain and the range carry different dimensions.