
It is well known that the product of two normal supersoluble subgroups need not be supersoluble in general. The author considers a class \(\mathfrak C\) of groups \(G\) which contain a normal subgroup \(N\) such that for some positive integer \(n\) every subgroup of the \(n\)th term of the lower central series of \(G/N'\) is normal in \(G/N'\). The author shows that every product of a normal finitely generated \(\mathfrak C\)-subgroup and a subnormal supersoluble subgroup is supersoluble. In particular, this implies that every product of a finite number of normal finitely generated \(\mathfrak C\)-subgroups is supersoluble.
cyclic-by-Abelian groups, Extensions, wreath products, and other compositions of groups, locally supersoluble groups, subnormal supersoluble subgroups, Solvable groups, supersolvable groups, Chains and lattices of subgroups, subnormal subgroups, nilpotent groups, products of subgroups, T-groups
cyclic-by-Abelian groups, Extensions, wreath products, and other compositions of groups, locally supersoluble groups, subnormal supersoluble subgroups, Solvable groups, supersolvable groups, Chains and lattices of subgroups, subnormal subgroups, nilpotent groups, products of subgroups, T-groups
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