Embedding lattices of quasivarieties of periodic groups into lattices of additively idempotent semiring varieties: An algebraic proof

Abstract

A general result by Jackson (Flat algebras and the translation of universal Horn logic to equational logic, J. Symb. Log. 73(1) (2008) 90--128) implies that the lattice of all quasivarieties of groups of exponent dividing n embeds into the lattice L(Srn) of all varieties of additively idempotent semirings whose multiplicative semigroups are unions of groups of exponent dividing n; the image of this embedding is an interval in L(Srn). We provide a new, direct, and purely algebraic proof of these facts and present a new identity basis for the top variety of the interval. In addition, we obtain new information about the lattice L(Srn), demonstrating that the properties of the lattice for n 3 differ drastically from those previously known when n=1 or 2.