Identities in differential perm algebras

Abstract

Let (P,·,d) be a differential perm algebra over a field of characteristic 0, i.e. an associative algebra satisfying (ab)c=(ba)c equipped with a derivation d. We investigate polynomial identities in the algebras obtained from d by the derived operations \[ a b=ab', a b=a'b, a b=ab'+ba', a b=a'b+ab', a b=ab'-ba', a b=a'b-ab', \] where a'=d(a). Our first result shows that any nontrivial differential polynomial identity (not supported by the right annihilator forced by the perm law) implies a purely differential consequence of the form a1'a2'·s am'=0 for some positive integer m. We then study the subalgebras of the free differential perm algebra generated by X under and under , giving explicit generating sets and computing the multilinear dimensions of their homogeneous components. Finally, we construct perm-Witt type Lie and Leibniz algebras arising naturally from differential perm algebras.