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Higher Polynomial Identities for Mutations of Associative Algebras.
We study polynomial identities satisfied by the mutation product xpy-yqx on the underlying vector space of an associative algebra A , where p , q are fixed elements of A . We simplify known results for identities in degree 4, proving that only two identities are necessary and sufficient to generate them all; in degree 5, we show that adding one new identity suffices; in degree 6, we demonstrate the existence of a significant number of new identities, which induce us to conjecture that the variety generated by mutation algebras of associative algebras is not finitely based.
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