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

Abstract

In a first objective we improve our understanding about surjective and bijective bounded linear operators preserving orthogonality from a JB*-algebra A into a JB*-triple E. Among many other conclusions, it is shown that a bounded linear bijection T: A E is orthogonality preserving if, and only if, it is biorthogonality preserving if, and only if, it preserves zero-triple-products in both directions (i.e., \a,b,c\=0 \T(a),T(b),T(c)\=0). In the second main result we establish a complete characterization of all one-parameter groups of orthogonality preserving operators on a JB*-algebra.