Solvable group
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In mathematics, more specifically in the field of group theory, a solvable group or soluble group is a group that can be constructed from abelian groups using extensions. Equivalently, a solvable group is a group whose derived series terminates in the trivial subgroup.
Historically, the word "solvable" arose from Galois theory and the proof of the general unsolvability of quintic equation. Specifically, a polynomial equation is solvable by radicals if and only if the corresponding Galois group is solvable.
Definition
A group G is called solvable if it has a subnormal series whose factor groups (quotient groups) are all abelian, that is, if there are subgroups {1} = G_{0} < G_{1} < ⋅⋅⋅ < G_{k} = G such that G_{j − 1} is normal in G_{j}, and G_{j}/G_{j − 1} is an abelian group, for j = 1, 2, …, k.
Or equivalently, if its derived series, the descending normal series
where every subgroup is the commutator subgroup of the previous one, eventually reaches the trivial subgroup {1} of G. These two definitions are equivalent, since for every group H and every normal subgroup N of H, the quotient ^{H}⁄_{N} is abelian if and only if N includes H^{(1)}. The least n such that G^{(n)} = {1} is called the derived length of the solvable group G.
For finite groups, an equivalent definition is that a solvable group is a group with a composition series all of whose factors are cyclic groups of prime order. This is equivalent because a finite group has finite composition length, and every simple abelian group is cyclic of prime order. The Jordan–Hölder theorem guarantees that if one composition series has this property, then all composition series will have this property as well. For the Galois group of a polynomial, these cyclic groups correspond to nth roots (radicals) over some field. The equivalence does not necessarily hold for infinite groups: for example, since every nontrivial subgroup of the group Z of integers under addition is isomorphic to Z itself, it has no composition series, but the normal series {0, Z}, with its only factor group isomorphic to Z, proves that it is in fact solvable.
Examples
All abelian groups are trivially solvable – a subnormal series being given by just the group itself and the trivial group. But nonabelian groups may or may not be solvable.
More generally, all nilpotent groups are solvable. In particular, finite pgroups are solvable, as all finite pgroups are nilpotent.
A small example of a solvable, nonnilpotent group is the symmetric group S_{3}. In fact, as the smallest simple nonabelian group is A_{5}, (the alternating group of degree 5) it follows that every group with order less than 60 is solvable.
The group S_{5} is not solvable — it has a composition series {E, A_{5}, S_{5}} (and the Jordan–Hölder theorem states that every other composition series is equivalent to that one), giving factor groups isomorphic to A_{5} and C_{2}; and A_{5} is not abelian. Generalizing this argument, coupled with the fact that A_{n} is a normal, maximal, nonabelian simple subgroup of S_{n} for n > 4, we see that S_{n} is not solvable for n > 4. This is a key step in the proof that for every n > 4 there are polynomials of degree n which are not solvable by radicals (Abel–Ruffini theorem). This property is also used in complexity theory in the proof of Barrington's theorem.
The celebrated Feit–Thompson theorem states that every finite group of odd order is solvable. In particular this implies that if a finite group is simple, it is either a prime cyclic or of even order.
Any finite group whose pSylow subgroups are cyclic is a semidirect product of two cyclic groups, in particular solvable. Such groups are called Zgroups.
Numbers of solvable groups with order n are (start with n = 0)
 0, 1, 1, 1, 2, 1, 2, 1, 5, 2, 2, 1, 5, 1, 2, 1, 14, 1, 5, 1, 5, 2, 2, 1, 15, 2, 2, 5, 4, 1, 4, 1, 51, 1, 2, 1, 14, 1, 2, 2, 14, 1, 6, 1, 4, 2, 2, 1, 52, 2, 5, 1, 5, 1, 15, 2, 13, 2, 2, 1, 12, 1, 2, 4, 267, 1, 4, 1, 5, 1, 4, 1, 50, ... (sequence A201733 in the OEIS)
Orders of nonsolvable groups are
 60, 120, 168, 180, 240, 300, 336, 360, 420, 480, 504, 540, 600, 660, 672, 720, 780, 840, 900, 960, 1008, 1020, 1080, 1092, 1140, 1176, 1200, 1260, 1320, 1344, 1380, 1440, 1500, ... (sequence A056866 in the OEIS)
Properties
Solvability is closed under a number of operations.
 If G is solvable, and there is a homomorphism from G onto H, then H is solvable; equivalently (by the first isomorphism theorem), if G is solvable, and N is a normal subgroup of G, then G/N is solvable.^{[1]}
 The previous property can be expanded into the following property: G is solvable if and only if both N and G/N are solvable.
 If G is solvable, and H is a subgroup of G, then H is solvable.^{[2]}
 If G and H are solvable, the direct product G × H is solvable.
Solvability is closed under group extension:
 If H and G/H are solvable, then so is G; in particular, if N and H are solvable, their semidirect product is also solvable.
It is also closed under wreath product:
 If G and H are solvable, and X is a Gset, then the wreath product of G and H with respect to X is also solvable.
For any positive integer N, the solvable groups of derived length at most N form a subvariety of the variety of groups, as they are closed under the taking of homomorphic images, subalgebras, and (direct) products. The direct product of a sequence of solvable groups with unbounded derived length is not solvable, so the class of all solvable groups is not a variety.
Burnside's theorem
Burnside's theorem states that if G is a finite group of order p^{a}q^{b} where p and q are prime numbers, and a and b are nonnegative integers, then G is solvable.
Related concepts
Supersolvable groups
As a strengthening of solvability, a group G is called supersolvable (or supersoluble) if it has an invariant normal series whose factors are all cyclic. Since a normal series has finite length by definition, uncountable groups are not supersolvable. In fact, all supersolvable groups are finitely generated, and an abelian group is supersolvable if and only if it is finitely generated. The alternating group A_{4} is an example of a finite solvable group that is not supersolvable.
If we restrict ourselves to finitely generated groups, we can consider the following arrangement of classes of groups:
 cyclic < abelian < nilpotent < supersolvable < polycyclic < solvable < finitely generated group.
Virtually solvable groups
A group G is called virtually solvable if it has a solvable subgroup of finite index. This is similar to virtually abelian. Clearly all solvable groups are virtually solvable, since one can just choose the group itself, which has index 1.
Hypoabelian
A solvable group is one whose derived series reaches the trivial subgroup at a finite stage. For an infinite group, the finite derived series may not stabilize, but the transfinite derived series always stabilizes. A group whose transfinite derived series reaches the trivial group is called a hypoabelian group, and every solvable group is a hypoabelian group. The first ordinal α such that G^{(α)} = G^{(α+1)} is called the (transfinite) derived length of the group G, and it has been shown that every ordinal is the derived length of some group (Malcev 1949).
See also
Notes
 ↑ Rotman (1995), Theorem 5.16, p. 102, at Google Books
 ↑ Rotman (1995), Theorem 5.15, p. 102, at Google Books
References
 Malcev, A. I. (1949), "Generalized nilpotent algebras and their associated groups", Mat. Sbornik N.S., 25 (67): 347–366, MR 0032644
 Rotman, Joseph J. (1995). An introduction to the theory of groups. Graduate texts in mathematics. 148 (4 ed.). Springer. ISBN 9780387942858.
External links
 "Sloane's A056866 : Orders of nonsolvable groups". The OnLine Encyclopedia of Integer Sequences. OEIS Foundation.