  
  
  [1m[4m[31mReferences[0m
  
  [33m[AK00]  [0m[1m[31mAmberg, B. and Kazarin, L. S. [0m, [34mOn the adjoint group of a finite
  nilpotent  $p$-algebra[0m,  J.  Math.  Sci.  (New  York),  [34m102[0m  (3) (2000),
  3979--3997
  
  [33m[AS01]  [0m[1m[31mAmberg,  B.  and  Sysak, Y. P. [0m, [34mRadical rings and their adjoint
  groups[0m, in [34mTopics in infinite groups[0m, Dept. Math., Seconda Univ. Napoli,
  Caserta, Quad. Mat., [34m8[0m (2001), 21--43
  
  [33m[AS02]  [0m[1m[31mAmberg, B. and Sysak, Y. P. [0m, [34mRadical rings with soluble adjoint
  groups[0m, J. Algebra, [34m247[0m (2) (2002), 692--702
  
  [33m[AS04]  [0m[1m[31mAmberg,  B. and Sysak, Y. P. [0m, [34mAssociative rings with metabelian
  adjoint group[0m, J. Algebra, [34m277[0m (2) (2004), 456--473
  
  [33m[AI97]  [0m[1m[31mArtemovych,  O.  D.  and  Ishchuk,  Y. B. [0m, [34mOn semiperfect rings
  determined by adjoint groups[0m, Mat. Stud., [34m8[0m (2) (1997), 162--170, 237
  
  [33m[G95]  [0m[1m[31mGorlov,  V.  O.  [0m,  [34mFinite  nilpotent  algebras with a metacyclic
  quasiregular group[0m, Ukra\"\i n. Mat. Zh., [34m47[0m (10) (1995), 1426--1431
  
  [33m[KS04]  [0m[1m[31mKazarin,  L.  S.  and Soules, P. [0m, [34mFinite nilpotent $p$-algebras
  whose  adjoint  group  has three generators[0m, JP J. Algebra Number Theory
  Appl., [34m4[0m (1) (2004), 113--127
  
  [33m[PS97]  [0m[1m[31mPopovich,  S.  V.  and  Sysak,  Y.  P.  [0m, [34mRadical algebras whose
  subgroups  of  adjoint  groups are subalgebras[0m, Ukra\"\i n. Mat. Zh., [34m49[0m
  (12) (1997), 1646--1652
  
  
  
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