Classification of abelian finite-dimensional C*-algebras by orthogonality
Abstract
The main goal of the article is to prove that if A1 and A2 are Birkhoff-James isomorphic C*-algebras over the fields F1 and F2, respectively and if A1 finite-dimensional, abelian of dimension greater than one, then F1= F2 and A1 and A2 are (isometrically) -isomorphic C*-algebras. Furthermore, it is also proved that for a finite-dimensional C*-algebra A, we have L A is the sum of minimal ideals which are not skew-fields and L A is the sum of minimal ideals which are skew-fields, where L A denotes the set of all left-symmetric elements in A and for any subset S⊂eq A, the set S represents the set of all elements of A which are Birkhoff-James orthogonal to S. A procedure to extract the minimal ideals which are (commutative) fields is also given.
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