Contractive linear preservers of absolutely compatible pairs between C*-algebras

Abstract

Let a and b be elements in the closed ball of a unital C*-algebra A (if A is not unital we consider its natural unitization). We shall say that a and b are domain (respectively, range) absolutely compatible (ad b, respectively, ar b, in short) if | |a| -|b| | + | 1-|a|-|b| | =1 (resp., | |a*| -|b*| | + | 1-|a*|-|b*| | =1), where |a|2= a* a. We shall say that a and b are absolutely compatible (a b in short) if they are both range and domain absolutely compatible. In general, ad b (respectively, ar b and a b) is strictly weaker than ab*=0 (respectively, a* b =0 and a b). Let T: A B be a contractive linear mapping between C*-algebras. We prove that if T preserves domain absolutely compatible elements (i.e., ad b⇒ T(a)d T(b)) then T is a triple homomorphism. A similar statement is proved when T preserves range absolutely compatible elements. It is finally shown that T is a triple homomorphism if, and only if, T preserves absolutely compatible elements.