Variety of groups
A class of all groups satisfying a fixed system of identity relations, or laws,
where runs through some set of group words, i.e. elements of the free group with free generators . Just like any variety of algebraic systems (cf. Algebraic systems, variety of), a variety of groups can also be defined by the property of being closed under subsystems (subgroups), homomorphic images and Cartesian products. The smallest variety containing a given class of groups is denoted by . Regarding the operations of intersection and union of varieties, defined by the formula
varieties of groups form a complete modular, but not distributive, lattice. The product of two varieties and is defined as the variety of groups consisting of all groups with a normal subgroup such that . Any variety of groups other than the variety of trivial groups and the variety of all groups can be uniquely represented as a product of varieties of groups which cannot be split further.
Examples of varieties of groups: the variety of all Abelian groups; the Burnside variety of all groups of exponent (index) , defined by the identity ; the variety ; the variety of all nilpotent groups of class ; the variety of all solvable groups of length ; in particular, if , is the variety of metabelian groups.
Let be some property of groups. One says that a variety of groups has the property (locally) if each (finitely-generated) group in has the property . One says, in this exact sense, that the variety is nilpotent, locally nilpotent, locally finite, etc.
The properties of a solvable variety of groups depend on . Thus, if , then for certain suitable and , . The description of metabelian varieties of groups is reduced, to a large extent, to the description of locally finite varieties of groups: If a metabelian variety is not locally finite, then
where , is uniquely representable as the union of a finite number of varieties of groups of the form , and is locally finite . Certain locally finite metabelian varieties have been described — for example, varieties of -groups of class (cf. ).
A variety of groups is said to be a Cross variety if it is generated by a finite group. Cross varieties of groups are locally finite. A variety of groups is said to be a near Cross variety if it is not Cross, but each of its proper subvarieties is Cross. The solvable near Cross varieties are exhausted by the varieties , , , , where are different prime numbers, for odd and . There exist, however, other near Cross varieties; such varieties are contained, for example, in any variety of all locally finite groups of exponent . An important role in the study of locally finite varieties of groups is played by critical groups — groups not contained in the variety generated by all their proper subgroups and quotient groups. A Cross variety can contain only a finite number of non-isomorphic critical groups. All locally finite varieties are generated by their critical groups.
A variety of groups is said to be finitely based if it can be specified by a given finite number of identities. These include, for example, all Cross, nilpotent and metabelian varieties. It has been proved  that non-finitely based varieties of groups exist, and that the number of all varieties of groups has the power of the continuum. For examples of infinite independent systems of identities see . A product of finitely-based varieties of groups is not necessarily finitely based; in particular, has no finite basis.
A variety of groups is a variety of Lie type if it is generated by its torsion-free nilpotent groups. If, in addition, the factors of the lower central series of the free groups of the variety are torsion-free groups, then the variety is said to be of Magnus type. The class of varieties of Lie type does not coincide with that of Magnus type; each of them is closed with respect to the operation of multiplication of varieties . Examples of varieties of Magnus type include the variety of all groups, the varieties , , and varieties obtained from by the application of a finite number of operations of intersection and multiplication .
|||H. Neumann, "Varieties of groups" , Springer (1967)|
|||M.I. Kargapolov, V.A. Churkin, "On varieties of solvable groups" Algebra and Logic , 10 : 6 (1971) pp. 359–398 Algebra i Logika , 10 : 6 (1971) pp. 651–657|
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|||R.A. Bryce, "Metabelian groups and varieties" Philos. Trans. Roy. Soc. London Ser. A , 266 (1970) pp. 281–355|
|||W. Brisley, "Varieties of metabelian -groups of class " J. Austr. Math. Soc. , 12 : 1 (1971) pp. 53–62|
|||A.Yu. Ol'shanskii, "Solvable just-non-Cross varieties of groups" Math. USSR Sb. , 14 : 1 (1971) pp. 115–129 Mat. Sb. , 85 : 1 (1971) pp. 115–131|
|||Yu.P. Razmyslov, "On Lie algebras satisfying the Engel condition" Algebra and Logic , 10 : 1 (1971) pp. 21–29 Algebra i Logika , 10 : 1 (1971) pp. 33–44|
|||A.Yu. Ol'shanskii, "On the problem of a finite basis of identities in groups" Math. USSR Izv. , 4 : 2 (1970) pp. 381–389 Izv. Akad. Nauk SSSR Ser. Mat. , 34 : 2 (1970) pp. 376–384|
|||S.I. Adyan, "The Burnside problem and identities in groups" , Springer (1979) (Translated from Russian)|
|||A.L. Shmel'kin, "Wreath product of Lie algebras and their applications in the theory of groups" Proc. Moscow Math. Soc. , 29 (1973) pp. 239–252 Trudy Moskov. Mat. Obshch. , 29 (1973) pp. 247–260|
|||Yu.M. Gorchakov, "Commutator subgroups" Sib. Math. J. , 10 : 5 (1969) pp. 754–761 Sibirsk. Mat. Zh. , 10 : 5 (1969) pp. 1023–1033|
The Oates–Powell theorem says that the variety generated by the finite groups is Cross. As a corollary it follows that the identities of finite groups admit a finite basis.
|[a1]||G. Birkhoff, "On the structure of abstract algebras" Proc. Cambridge Phil. Soc. , 31 (1935) pp. 433–454|
|[a2]||B.H. Neumann, "Identical relations in groups I" Math. Ann. , 114 (1937) pp. 506–525|
Variety of groups. A.L. Shmel'kin (originator), Encyclopedia of Mathematics. URL: http://www.encyclopediaofmath.org/index.php?title=Variety_of_groups&oldid=13126