- Imperfect group
In
mathematics , in the area ofalgebra known asgroup theory , an imperfect group is a group with no nontrivial perfect quotients. Some of their basic properties were established in harv|Berrick|Robinson|1993. The study of imperfect groups apparently began in harv|Robinson|1972 [That this is the first such investigation is indicated in harv|Berrick|Robinson|1993] .The class of imperfect groups is closed under extension and quotient groups, but not under
subgroup s. If "G" is a group, "N", "M" are normal subgroups with "G"/"N" and "G"/"M" imperfect, then "G"/("N"∩"M") is imperfect, showing that the class of imperfect groups is a formation. The (restricted or unrestricted)direct product of imperfect groups is imperfect.Every
solvable group is imperfect. Finitesymmetric group s are also imperfect. Thegeneral linear group s PGL(2,"q") are imperfect for "q" an odd prime power. For any group "H", thewreath product "H" wr "Sym"2 of "H" with thesymmetric group on two points is imperfect. In particular, every group can be embedded as a two-stepsubnormal subgroup of an imperfect group of roughly the same cardinality (2|"H"|2).References
* | year=1993 | journal=Journal of Pure and Applied Algebra | issn=0022-4049 | volume=88 | issue=1 | pages=3–22
*Citation | last1=Robinson | first1=Derek John Scott | title=Finiteness conditions and generalized soluble groups. Part 2 | publisher=Springer-Verlag | location=Berlin, New York | id=MathSciNet | id = 0332990 | year=1972
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