Algebraic Maximal Numerical Range and its preservers of Triple Products on C*-Algebras
Abstract
Let A and B be unital C*-algebras, and let V0(a)=\f(a): f∈ S( A), f(a*a)=\|a\|2\ be the algebraic maximal numerical range of a∈A, where S( A) is the set of all states of A. We study the properties of V0(a) and characterize surjective maps preserving V0 of triple products. We show that if Φ satisfies \(V0(Φ(a)Φ(b)Φ(c))=V0(abc) ~for all~ a,b,c∈A,\) then the map a Φ(1A)-1Φ(a) is a multiplicative bijection. Furthermore, for von Neumann algebras without central summands of type I1 or prime C*-algebras of real rank zero, such preservers are precisely *-isomorphisms multiplied by a central element u∈ Z(B) with u3=1.
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