One-parameter groups of orthogonality preservers on C*-algebras

Abstract

We establish a more precise description of those surjective or bijective continuous linear operators preserving orthogonality between C*-algebras. The new description is applied to determine all uniformly continuous one-parameter semigroups of orthogonality preserving operators on an arbitrary C*-algebra. We prove that given a family \Tt: t∈ R0+\ of orthogonality preserving bounded linear bijections on a general C*-algebra A with T0=Id, if for each t≥ 0, we set ht = Tt** (1) and we write rt for the range partial isometry of ht in A**, and St stands for the triple isomorphism on A associated with Tt satisfying ht* St(x) = St(x*)* ht, ht St(x*)* = St(x) ht*, ht rt* St(x) = St(x) rt* ht, and Tt(x) = ht rt* St(x) = St(x) rt* ht, for all x∈ A, the following statements are equivalent: (a) \Tt: t∈ R0+\ is a uniformly continuous one-parameter semigroup of orthogonality preserving operators on A; (b) \St: t∈ R0+\ is a uniformly continuous one-parameter semigroup of surjective linear isometries (i.e. triple isomorphisms) on A (and hence there exists a triple derivation δ on A such that St = et δ for all t∈ R), the mapping t ht is continuous at zero, and the identity ht+s = ht rt* St** (hs), holds for all s,t∈ R.