Maps preserving the truncation of triple products on Cartan factors
Abstract
Let \Ci\i∈ 1, and \Dj\j∈ 2, be two families of Cartan factors such that all of them have dimension at least 2, and consider the atomic JBW*-triples A=i∈ 1∞ Ci and B=j∈ 2∞ Dj. Let :A B be a (non-necessarily linear nor continuous) bijection preserving the truncation of triple products in both directions, that is, aligned a is a truncation of \b,c,b\ (a) is a truncation of \(b),(c),(b)\ aligned Assume additionally that the restriction of to each rank-one Cartan factor in A, if any, is a continuous mapping. Then we show that is an isometric real linear triple isomorphism. We also study some general properties of bijections preserving the truncation of triple products in both directions between general JB*-triples.
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