Polynomial invariants for low dimensional algebras

Abstract

We classify all two-dimensional simple algebras (which may be non-associative) over an algebraically closed field. For each two-dimensional algebra A, we describe a minimal (with respect to inclusion) generating set for the algebra of invariants of the m-tuples of A in the case of characteristic zero. In particular, we establish that for any two-dimensional simple algebra A with a non-trivial automorphism group, the Artin--Procesi--Iltyakov Equality holds for Am; that is, the algebra of polynomial invariants of m-tuples of A is generated by operator traces. As a consequence, we describe two-dimensional algebras that admit a symmetric or skew-symmetric invariant nondegenerate bilinear form.

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