In mathematics, especially in the fields of group theory and Lie theory, a central series is a kind of normal series of subgroups or Lie subalgebras, expressing the idea that the commutator is nearly trivial. For groups, the existence of a central series means it is a nilpotent group; for matrix rings (considered as Lie algebras), it means that in some basis the ring consists entirely of upper triangular matrices with constant diagonal. This article uses the language of group theory; analogous terms are used for Lie algebras. A general group possesses a lower central series and upper central series (also called the descending central series and ascending central series, respectively), but these are central series in the strict sense (terminating in the trivial subgroup) if and only if the group is nilpotent. A related but distinct construction is the derived series, which terminates in the trivial subgroup whenever the group is solvable. A central series is a sequence of subgroups such that the successive quotients are central; that is, , where denotes the commutator subgroup generated by all elements of the form , with g in G and h in H. Since , the subgroup is normal in G for each i. Thus, we can rephrase the 'central' condition above as: is normal in G and is central in for each i. As a consequence, is abelian for each i. A central series is analogous in Lie theory to a flag that is strictly preserved by the adjoint action (more prosaically, a basis in which each element is represented by a strictly upper triangular matrix); compare Engel's theorem. A group need not have a central series. In fact, a group has a central series if and only if it is a nilpotent group. If a group has a central series, then there are two central series whose terms are extremal in certain senses. Since A0 = {1}, the center Z(G) satisfies A1 ≤ Z(G). Therefore, the maximal choice for A1 is A1 = Z(G). Continuing in this way to choose the largest possible Ai + 1 given Ai produces what is called the upper central series.

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