
doi: 10.1007/bf02679747
Using the Jordan analogs of annihilators, the author gives equivalent algebraic conditions each of which may serve as a definition of \(AJW\)-algebra. Some theorem is established that replaces Albert's theorem in the case of general \(JB\)-algebras and generalizes the latter to some extent.
Classifications of \(C^*\)-algebras, factor, Jordan structures on Banach spaces and algebras, \(JB\)-algebra, Albert's theorem, projection, \(AJW\)-algebra, Nonassociative selfadjoint operator algebras, Jordan analogs of annihilators
Classifications of \(C^*\)-algebras, factor, Jordan structures on Banach spaces and algebras, \(JB\)-algebra, Albert's theorem, projection, \(AJW\)-algebra, Nonassociative selfadjoint operator algebras, Jordan analogs of annihilators
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