Lattices embeddable in subsemigroup lattices. II. Cancellative semigroups

L. N. Shevrin and A. Ya. Ovsyannikov, Semigroups and Their Subsemigroup Lattices, Kluwer, Dordrecht (1996). Ph. M. Whitman, “Lattices, equivalence relations, and subgroups,” Bull. Am. Math. Soc., 52, 507–522 (1946). D. A. Bredikhin and B. M. Schein, “Representations of ordered semigroups and lattices by binary relations,” Coll. Math., 39, 1–12 (1978). M. V. Semenova, “Lattices that are embeddable in suborder lattices,” Algebra Logika, 44, No. 4, 483–511 (2005). V. B. Repnitskii, “The representation of lattices by lattices of subsemigroups,” Izv. Vyssh. Uch. Zav., Mat., 40, No. 1, 60–70 (1996). M. V. Semenova, “Lattices embeddable in subsemigroup lattices. I. Semilattices,” Algebra Logika, 45, No. 2, 215–230 (2006). M. V. Semenova, “Lattices embeddable in subsemigroup lattices. III. Nilpotent semigroups,” to appear in Sib. Mat. Zh. M. Semenova and F. Wehrung, “Sublattices of lattices of order-convex sets, I. The main representation theorem,” J. Alg., 277, 825–860 (2004). M. Semenova and F. Wehrung, “Sublattices of lattices of order-convex sets, II. Posets of finite length,” Int. J. Alg. Comp., 13, No. 5, 543–564 (2003). M. Semenova and F. Wehrung, “Sublattices of lattices of order-convex sets, III. The case of totally ordered sets,” Int. J. Alg. Comp., 14, 357–387 (2004). F. Wehrung and M. Semenova, “Sublattices of lattices of convex subsets of vector spaces,” Algebra Logika, 43, No. 3, 261–290 (2004). M. V. Semenova, “Lattices of suborders,” Sib. Mat. Zh., 40, No. 3, 673–682 (1999). R. Freese, J. Ježek, and J. B. Nation, Free Lattices, Math. Surv. Mon., Vol. 42, Am. Math. Soc., Providence, RI (1995). G. Grätzer, General Lattice Theory, 2nd ed., Birkhauser Verlag, Basel (1998).