On the Zelmanovian Classification of Prime JB*-Triples

## Abstract In the last twenty years, a theory of real Jordan triples has been developed. In 1994 T. Dang and B. Russo introduced the concept of J\*B–triple. These J\*B–triples include real C\*–algebras and complex JB\*–triples. However, concerning J\*B–triples, an important problem was left open.

## Abstract A Banach space __X__ is said to have the __alternative Daugavet property__ if for every (bounded and linear) rank‐one operator __T__: __X__ → __X__ there exists a modulus one scalar __ω__ such that ∥Id+__ωT__ ∥ = 1 + ∥__T__ ∥. We give geometric characterizations of this property in the

Let p be an odd prime and n a positive integer and let k be a field of Ž . r p and let r denote the largest integer between 0 and n such that K l k s p Ž . r r r k , where denotes a primitive p th root of unity. The extension Krk is p p separable, but not necessarily normal and, by Greither and Pa

The notion of a coherent decomposition of a metric on a finite set has proven fruitful, with applications to areas such as the geometry of metric cones and bioinformatics. In order to obtain a deeper insight into these decompositions it is important to improve our knowledge of those metrics which ca