  
  
  [1XReferences[101X
  
  [[20XBE99a[120X]  [16XBesche,  H.  U.  and  Eick,  B.[116X,  [17XConstruction of finite groups[117X, [18XJ.
  Symbolic Comput.[118X, [19X27[119X, 4 (1999), 387–404.
  
  [[20XBE99b[120X]  [16XBesche, H. U. and Eick, B.[116X, [17XThe groups of order at most 1000 except
  512 and 768[117X, [18XJ. Symbolic Comput.[118X, [19X27[119X, 4 (1999), 405–413.
  
  [[20XBE01[120X]  [16XBesche,  H.  U.  and  Eick,  B.[116X,  [17XThe groups of order q^n ⋅ p[117X, [18XComm.
  Algebra[118X, [19X29[119X, 4 (2001), 1759–1772.
  
  [[20XBEO01[120X]  [16XBesche,  H. U., Eick, B. and O'Brien, E. A.[116X, [17XThe groups of order at
  most  2000[117X,  [18XElectron.  Res.  Announc.  Amer.  Math.  Soc.[118X,  [19X7[119X  (2001),  1–4
  (electronic).
  
  [[20XBEO02[120X]  [16XBesche,  H.  U., Eick, B. and O'Brien, E. A.[116X, [17XA millennium project:
  constructing  small  groups[117X,  [18XInternat.  J.  Algebra  Comput.[118X, [19X12[119X, 5 (2002),
  623–644.
  
  [[20XBur21[120X]  [16XBurrell,  D.[116X, [17XOn the number of groups of order 1024[117X, [18XCommunications
  in Algebra[118X (2021), 1–3.
  
  [[20XDE05[120X]  [16XDietrich,  H.  and  Eick,  B.[116X,  [17XOn the groups of cube-free order[117X, [18XJ.
  Algebra[118X, [19X292[119X, 1 (2005), 122–137.
  
  [[20XEO99a[120X] [16XEick, B. and O'Brien, E. A.[116X, [17XEnumerating p-groups[117X, [18XJ. Austral. Math.
  Soc. Ser. A[118X, [19X67[119X, 2 (1999), 191–205, ((Group theory)).
  
  [[20XEO99b[120X]  [16XEick, B. and O'Brien, E. A.[116X ([1m[31mMatzat, B. H., Greuel, G.-M. and Hiss,
  G.[15X, Eds.), [17XThe groups of order 512[117X, in Algorithmic algebra and number theory
  (Heidelberg,  1997),  Springer,  Berlin  (1999),  379–380,  ((Proceedings of
  Abschlusstagung   des   DFG   Schwerpunktes   Algorithmische   Algebra   und
  Zahlentheorie in Heidelberg)).
  
  [[20XGir03[120X]  [16XGirnat,  B.[116X,  [17XKlassifikation  der  Gruppen  bis  zur  Ordnung  p^5[117X,
  Staatsexamensarbeit, TU Braunschweig, Braunschweig, Germany (2003).
  
  [[20XNew77[120X]  [16XNewman,  M.  F.[116X ([1m[31mBryce, R. A., Cossey, J. and Newman, M. F.[15X, Eds.),
  [17XDetermination  of  groups  of  prime-power  order[117X,  in  Group  theory (Proc.
  Miniconf.,  Australian  Nat. Univ., Canberra, 1975), Springer, Lecture Notes
  in  Math.,  [19X573[119X,  Berlin  (1977),  73–84.  Lecture Notes in Math., Vol. 573,
  ((Lecture Notes in Mathematics, Vol. 573)).
  
  [[20XNOVL04[120X]  [16XNewman,  M.  F., O'Brien, E. A. and Vaughan-Lee, M. R.[116X, [17XGroups and
  nilpotent  Lie  rings whose order is the sixth power of a prime[117X, [18XJ. Algebra[118X,
  [19X278[119X, 1 (2004), 383–401.
  
  [[20XO'B90[120X]  [16XO'Brien,  E.  A.[116X,  [17XThe  p-group  generation  algorithm[117X, [18XJ. Symbolic
  Comput.[118X, [19X9[119X, 5-6 (1990), 677–698, ((Computational group theory, Part 1)).
  
  [[20XO'B91[120X]  [16XO'Brien, E. A.[116X, [17XThe groups of order 256[117X, [18XJ. Algebra[118X, [19X143[119X, 1 (1991),
  219–235.
  
  [[20XOVL05[120X] [16XO'Brien, E. A. and Vaughan-Lee, M. R.[116X, [17XThe groups with order p^7 for
  odd prime p[117X, [18XJ. Algebra[118X, [19X292[119X, 1 (2005), 243–258.
  
  
  
  [32X
