On commutative isotopes of Jordan algebra of a symmetric bilinear nondegenerate form on a two-dimensional vector space

Abstract

In the article we study the simple unital communitative three-dimensional algebras over an algebraically closed field of characteristic not equal to 2. It is proved that every simple unital communitative three-dimensional algebra of nil-rank 2 is isotopic to Jordan algebra of a symmetric bilinear nondegenerate form on a two-dimensional vector space.

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