Finiteness conditions for the weak commutativity construction

Abstract

The operator, , of weak commutativity between isomorphic groups G and G was introduced by Sidki as equation* (G)= G G g,g ]=1\,∀ \,g∈ G . equation* It is known that the operator preserves group properties such as finiteness, solubility and also nilpotency for finitely generated groups. We prove that if G is a locally finite group with exp(G)=n, then (G) is locally finite and has finite n-bounded exponent. Further, we examine some finiteness criteria for the subgroup D(G) = [g1,g2] gi ∈ G ≤slant (G) in terms of the set \[g1,g2] gi ∈ G\.