On the structure and classification of Bernstein algebras
Abstract
We prove that any Bernstein algebra (A, ω) is isomorphic to a semidirect product V (·, \, ) \, k associated to a commutative algebra (V, ·) such that (x2)2 = 0, for all x∈ A and an idempotent endomorphism = 2 ∈ Endk (V) of V satisfying two compatibility conditions. The set of types of (1 + |I|)-dimensional Bernstein algebras is parametrized by an explicitely constructed (using linear algebra tools) classified object. The automorphisms group of any Bernstein algebra is described as a subgroup of the canonical semidirect product of groups (V, +) GLk (V).
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