论文信息 - Locality of DS and associated varieties

Locality of DS and associated varieties

We prove that the pseudovariety DS, of all finite monoids, each of whose regular D-classes is a subsemigroup, is local. (A pseudovariety (or variety) V is local if any category whose local monoids belong to V divides a member of V.) The proof uses the “kernel theorem” of the first author and Pustejovsky together with the description by Weil of DS as an iterated “block product”. The one-sided analogues of these methods provide wide new classes of local pseudovarieties of completely regular monoids. We conclude, however, with the second author's example of a variety (and a pseudovariety) of completely regular monoids that is not local.

Peter R. Jones | Peter G. Trotter | P. G. Trotter

[1] Denis Thérien,et al. Varieties of Finite Categories , 1986, RAIRO Theor. Informatics Appl..

[2] Pascal Weil,et al. Closure of Varieties of Languages under Products with Counter , 1992, J. Comput. Syst. Sci..

[3] Mal'cev products of varieties of completely regular semigroups , 1987 .

[4] Bret Tilson,et al. Categories as algebra: An essential ingredient in the theory of monoids , 1987 .

[5] Denis Thérien,et al. Two-sided wreath product of categories , 1991 .

[6] Raymond E. Miller,et al. Varieties of Formal Languages , 1986 .

[7] D. Thérien,et al. Finite categories and regular languages , 1988 .

[8] J. Green,et al. On semi-groups in which xr = x , 1952, Mathematical Proceedings of the Cambridge Philosophical Society.

[9] John Rhodes,et al. The kernel of monoid morphisms , 1989 .

[10] P. G. Trotter,et al. Residual finiteness in completely regular semigroup varieties , 1988 .

[11] Assis Azevedo. Implicit operations on DS , 1991 .

[12] Peter R. Jones,et al. Local Varieties of Completely Regular Monoids , 1992 .

[13] M. Schützenberger,et al. Sur Le Produit De Concatenation Non Ambigu , 1976 .

[14] Pascal Weil,et al. Decomposition techniques for finite semigroups, using categories II , 1989 .

[15] Robert Knast. Some Theorems on Graph Congruences , 1983, RAIRO Theor. Informatics Appl..