Adaricheva, KiraNation, J.B.2016-02-092016-02-092012Adaricheva Kira, Nation J. B.; 2012; Lattices of quasi-equational theories as congruence lattices of semilattices with operators, part II; arXiv.orghttp://nur.nu.edu.kz/handle/123456789/1207Part I proved that for every quasivariety K of structures (which may have both operations and relations) there is a semilattice S with operators such that the lattice of quasi-equational theories of K (the dual of the lattice of sub-quasivarieties of K) is isomorphic to Con(S;+; 0; F). It is known that if S is a join semilattice with 0 (and no operators), then there is a quasivariety Q such that the lattice of theories of Q is isomorphic to Con(S;+; 0). We prove that if S is a semilattice having both 0 and 1 with a group G of operators acting on S, and each operator in G xes both 0 and 1, then there is a quasivariety W such that the lattice of theories of W is isomorphic to Con(S;+; 0; G).enAttribution-NonCommercial-ShareAlike 3.0 United StatesResearch Subject Categories::MATHEMATICSlattices of quasi-equational theoriesLattices of quasi-equational theories as congruence lattices of semilattices with operators, part IIArticle