Lie properties in associative algebras

Abstract

Let K be a field, then we exhibit two matrices in the full nxn matrix algebra Mn(K) which generate Mn(K) as a Lie K-algebra with the commutator Lie product. We also study Lie centralizers of a not necessarily commutative unitary algebra and obtain results which we hope will eventually be a step in the direction of, firstly, proving that a Lie-nilpotent K-subspace (or a sub Lie K-algebra) of a finite-dimensional associative algebra over K of index k (say) generates a Lie-nilpotent associative subalgebra of much higher nilpotency index, and secondly, in the light of the sharp upper bound for the maximum (K-)dimension of a Lie-nilpotent K-subalgebra of Mn(K) of index k (obtained earlier), finding an upper bound for the maximum dimension of a Lie-nilpotent (of index k) sub Lie K-algebra of Mn(K). Finally, the constructive elementary proof of the Skolem-Noether theorem for the matrix algebra Mn(K) (appeared in the American Math. Monthly), in conjunction with the well-known characteization of Lie automorphisms of Mn(K) (if the characteristic of K is different from 2 and 3) in terms of, amongst others, automorphisms and anti-automorhisms of Mn(K), leads us to a unifying approach to constructively describe automorphisms and anti-automorphisms of Mn(K).

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