Primitive Permutation Groups and Strongly Factorizable Transformation Semigroups

Abstract

Let be a finite set and T() be the full transformation monoid on . The rank of a transformation t∈ T() is the natural number | t|. Given A⊂eq T(), denote by A the semigroup generated by A. Let k be a fixed natural number such that 2 k ||. In the first part of this paper we (almost) classify the permutation groups G on such that for all rank k transformation t∈ T(), every element in St:= G,t can be written as a product eg, where e2=e∈ St and g∈ G. In the second part we prove, among other results, that if S T() and G is the normalizer of S in the symmetric group on , then the semigroup SG is regular if and only if S is regular. (Recall that a semigroup S is regular if for all s∈ S there exists s'∈ S such that s=ss's.) The paper ends with a list of problems.