论文信息 - On the centralizers of monoids in clone theory

On the centralizers of monoids in clone theory

For a set S of functions of k-valued logic, the centralizer S* is the set of functions which 'permute' with all functions in S. As a continuation of our previous work we study the centralizers for certain monoids consisting of unary functions. First we show that the centralizers of permutation groups are distinct to each other, and then characterize the centralizer of the alternating group. Next, for certain monoids whose centralizer is the smallest clone J/sub k/, we study the centralizers of some of its proper submonoids. In particular, we report the existence of a considerably small monoid whose centralizer is J/sub k/ as well.

Ivo G. Rosenberg | Hajime Machida

[1] Ivo G. Rosenberg,et al. Some results on the centralizers of monoids in clone theory , 2002, Proceedings 32nd IEEE International Symposium on Multiple-Valued Logic.

[2] Ivo G. Rosenberg,et al. Relations between clones and full monoids , 2001, Proceedings 31st IEEE International Symposium on Multiple-Valued Logic.

[3] A. F. Danil'chenko. Parametric expressibility of functions of three-valued logic , 1977 .

[4] László Szabó. Characterization of clones acting bicentrally and containing a primitive group , 1985, Acta Cybern..

[5] S. Swierczkowski. Algebras which are independently generated by every n elements , 1960 .

[6] Stanley Burris,et al. Finitely many primitive positive clones , 1987 .