The order of the product of two elements in the periodic groups

Abstract

Let G be a periodic group, and let LCM(G) be the set of all x∈ G such that o(xnz) divides the least common multiple of o(xn) and o(z) for all z in G and all integers n. In this paper, we prove that the subgroup generated by LCM(G) is a locally nilpotent characteristic subgroup of G whenever G is a locally finite group. For x,y∈ G the vertex x is connected to vertex y whenever o(xy) divides the least common multiple of o(x) and o(y). Let Deg(G) be the sum of all deg(g) where g runs over G. We prove that for any finite group G with h(G) conjugacy classes, Deg(G)=|G|(h(G)+1) if and only if G is an abelian group.