Uni-width subgroups, universal elements, and lambda number of finite groups

Abstract

A cyclic subgroup N of a finite group G is called a uni-width subgroup of G if N is the unique cyclic subgroup of G of order |N|. In this article, we prove that a finite group G admits a unique largest uni-width subgroup denoted by U(1;G). We then show that the prime factors of the order of U(1;G) influence the structure decomposition of its Fitting subgroup Fit(G). A power graph G of a finite group is defined by G being its set of vertices, and a pair of distinct elements x,y ∈ G are connected by an edge if either x ∈ y or y ∈ x . A universal element of a graph is a vertex that is adjacent to each of the remaining vertices. Our following result shows that a power graph G of a finite non-trivial group admits a non-identity universal element if and only if it is either cyclic or a generalized quaternion 2-group. The lambda number λ(G) of a finite group G is a measure of the least number of colors required for an L(2,1)-type of vertex coloring on G, which is known to be ≥ |G|. Generalizing an earlier result, we then derive a necessary condition on a finite group G such that λ(G) = |G|. Finally, we show that this result is best possible by exhibiting a family of groups without the necessary condition for which λ(G) > |G|.