Linear maps between C*-algebras preserving extreme points and strongly linear preservers
Abstract
We study new classes of linear preservers between C*-algebras and JB*-triples. Let E and F be JB*-triples with ∂e (E1). We prove that every linear map T:E F strongly preserving Brown-Pedersen quasi-invertible elements is a triple homomorphism. Among the consequences, we establish that, given two unital C*-algebras A and B, for each linear map T strongly preserving Brown-Pedersen quasi-invertible elements, then there exists a Jordan *-homomorphism S: A B satisfying T(x) = T(1) S(x), for every x∈ A. We also study the connections between linear maps strongly preserving Brown-Pedersen quasi-invertibility and other clases of linear preservers between C*-algebras like Bergmann-zero pairs preservers, Brown-Pedersen quasi-invertibility preservers and extreme points preservers.
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