Let 2N be the variety of left-nilpotent algebras of index two, that is the variety of algebras satisfying the identity x(yz) = 0. We introduce two new varieties, denoted by Vsym and Valt; contained in the variety 2N and we prove that Vsym and Valt are the only two varieties almost nilpotent of subexponential growth.
|Number of pages||0|
|Journal||Journal of Algebra|
|Publication status||Published - 2014|