Two Generalizations of Homogeneity in Groups with Applications to Regular Semigroups

Abstract

Let X be a finite set such that |X|=n and let i≤ j ≤ n. A group G≤ is said to be (i,j)-homogeneous if for every I,J⊂eq X, such that |I|=i and |J|=j, there exists g∈ G such that Ig⊂eq J. (Clearly (i,i)-homogeneity is i-homogeneity in the usual sense.) A group G≤ is said to have the k-universal transversal property if given any set I⊂eq X (with |I|=k) and any partition P of X into k blocks, there exists g∈ G such that Ig is a section for P. (That is, the orbit of each k-subset of X contains a section for each k-partition of X.) In this paper we classify the groups with the k-universal transversal property (with the exception of two classes of 2-homogeneous groups) and the (k-1,k)-homogeneous groups (for 2<k≤ n+12). As a corollary of the classification we prove that a (k-1,k)-homogeneous group is also (k-2,k-1)-homogeneous, with two exceptions; and similarly, but with no exceptions, groups having the k-universal transversal property have the (k-1)-universal transversal property. A corollary of all the previous results is a classification of the groups that together with any rank k transformation on X generate a regular semigroup (for 1≤ k≤ n+12). The paper ends with a number of challenges for experts in number theory, group and/or semigroup theory, linear algebra and matrix theory.