  
  
  [1XReferences[101X
  
  [[20XArt15[120X]  [16XArtic,  K.[116X,  [17XOn  conjugacy  closed  loops and conjugacy closed loop
  folders[117X, Ph.D. thesis, RWTH Aachen University (2015).
  
  [[20XArt59[120X]  [16XArtzy,  R.[116X, [17XOn automorphic-inverse properties in loops[117X, [18XProc. Amer.
  Math. Soc.[118X, [19X10[119X (1959), 588–591.
  
  [[20XBru58[120X]  [16XBruck,  R.  H.[116X,  [17XA  survey  of  binary  systems[117X,  Springer  Verlag,
  Ergebnisse  der  Mathematik  und  ihrer  Grenzgebiete.  Neue Folge, Heft 20.
  Reihe: Gruppentheorie, Berlin (1958), viii+185 pages.
  
  [[20XBP56[120X]  [16XBruck,  R.  H.  and  Paige,  L.  J.[116X,  [17XLoops whose inner mappings are
  automorphisms[117X, [18XAnn. of Math. (2)[118X, [19X63[119X (1956), 308–323.
  
  [[20XCR99[120X]  [16XColbourn,  C.  J.  and Rosa, A.[116X, [17XTriple systems[117X, The Clarendon Press
  Oxford  University  Press,  Oxford Mathematical Monographs, New York (1999),
  xvi+560 pages.
  
  [[20XCD05[120X]  [16XCsörgő, P. and Drápal, A.[116X, [17XLeft conjugacy closed loops of nilpotency
  class two[117X, [18XResults Math.[118X, [19X47[119X, 3-4 (2005), 242–265.
  
  [[20XDV09[120X]  [16XDaly,  D.  and  Vojtěchovský, P.[116X, [17XEnumeration of nilpotent loops via
  cohomology[117X, [18XJ. Algebra[118X, [19X322[119X, 11 (2009), 4080–4098.
  
  [[20XBGV12[120X]  [16XDe Barros, D. A. S., Grishkov, A. and Vojtěchovský, P.[116X, [17XCommutative
  automorphic loops of order p^3[117X, [18XJ. Algebra Appl.[118X, [19X11[119X, 5 (2012), 1250100, 15.
  
  [[20XDrá03[120X]  [16XDrápal,  A.[116X,  [17XCyclic  and  dihedral  constructions  of  even order[117X,
  [18XComment. Math. Univ. Carolin.[118X, [19X44[119X, 4 (2003), 593–614.
  
  [[20XDV06[120X]  [16XDrápal, A. and Vojtěchovský, P.[116X, [17XMoufang loops that share associator
  and  three quarters of their multiplication tables[117X, [18XRocky Mountain J. Math.[118X,
  [19X36[119X, 2 (2006), 425–455.
  
  [[20XFen69[120X]   [16XFenyves,  F.[116X,  [17XExtra  loops.  II.  On  loops  with  identities  of
  Bol-Moufang type[117X, [18XPubl. Math. Debrecen[118X, [19X16[119X (1969), 187–192.
  
  [[20XGMR99[120X]  [16XGoodaire,  E. G., May, S. and Raman, M.[116X, [17XThe Moufang loops of order
  less  than  64[117X,  Nova Science Publishers Inc., Commack, NY (1999), xviii+287
  pages.
  
  [[20XGre14[120X]  [16XGreer, M.[116X, [17XA class of loops categorically isomorphic to Bruck loops
  of odd order[117X, [18XComm. Algebra[118X, [19X42[119X, 8 (2014), 3682–3697.
  
  [[20XGKN14[120X] [16XGrishkov, A., Kinyon, M. and Nagy, G. P.[116X, [17XSolvability of commutative
  automorphic loops[117X, [18XProc. Amer. Math. Soc.[118X, [19X142[119X, 9 (2014), 3029–3037.
  
  [[20XJM96[120X]  [16XJacobson,  M.  T. and Matthews, P.[116X, [17XGenerating uniformly distributed
  random Latin squares[117X, [18XJ. Combin. Des.[118X, [19X4[119X, 6 (1996), 405–437.
  
  [[20XJKV12[120X]  [16XJedlička,  P.,  Kinyon,  M.  and  Vojtěchovský,  P.[116X,  [17XNilpotency in
  automorphic loops of prime power order[117X, [18XJ. Algebra[118X, [19X350[119X (2012), 64–76.
  
  [[20XJKNV11[120X]  [16XJohnson,  K.  W., Kinyon, M. K., Nagy, G. P. and Vojtěchovský, P.[116X,
  [17XSearching  for  small  simple  automorphic  loops[117X,  [18XLMS J. Comput. Math.[118X, [19X14[119X
  (2011), 200–213.
  
  [[20XKKP02[120X]  [16XKinyon,  M.  K., Kunen, K. and Phillips, J. D.[116X, [17XEvery diassociative
  A-loop is Moufang[117X, [18XProc. Amer. Math. Soc.[118X, [19X130[119X, 3 (2002), 619–624.
  
  [[20XKKPV16[120X] [16XKinyon, M. K., Kunen, K., Phillips, J. D. and Vojtěchovský, P.[116X, [17XThe
  structure  of  automorphic  loops[117X,  [18XTrans. Amer. Math. Soc.[118X, [19X368[119X, 12 (2016),
  8901–8927.
  
  [[20XKNV15[120X] [16XKinyon, M. K., Nagy, G. P. and Vojtěchovský, P.[116X, [17XBol loops and Bruck
  loops of order pq[117X, [18X[118X (2015), ((preprint)).
  
  [[20XKun00[120X]  [16XKunen,  K.[116X,  [17XThe  structure of conjugacy closed loops[117X, [18XTrans. Amer.
  Math. Soc.[118X, [19X352[119X, 6 (2000), 2889–2911.
  
  [[20XLie87[120X]  [16XLiebeck,  M. W.[116X, [17XThe classification of finite simple Moufang loops[117X,
  [18XMath. Proc. Cambridge Philos. Soc.[118X, [19X102[119X, 1 (1987), 33–47.
  
  [[20XMoo[120X]     [16XMoorhouse,     G.     E.[116X,    [17XBol    loops    of    small    order[117X,
  ((http://www.uwyo.edu/moorhouse/pub/bol/)).
  
  [[20XNV03[120X] [16XNagy, G. P. and Vojtěchovský, P.[116X, [17XOctonions, simple Moufang loops and
  triality[117X, [18XQuasigroups Related Systems[118X, [19X10[119X (2003), 65–94.
  
  [[20XNV07[120X]  [16XNagy,  G. P. and Vojtěchovský, P.[116X, [17XThe Moufang loops of order 64 and
  81[117X, [18XJ. Symbolic Comput.[118X, [19X42[119X, 9 (2007), 871–883.
  
  [[20XPfl90[120X]  [16XPflugfelder, H. O.[116X, [17XQuasigroups and loops: introduction[117X, Heldermann
  Verlag, Sigma Series in Pure Mathematics, [19X7[119X, Berlin (1990), viii+147 pages.
  
  [[20XPV05[120X]  [16XPhillips,  J.  D.  and  Vojtěchovský,  P.[116X, [17XThe varieties of loops of
  Bol-Moufang type[117X, [18XAlgebra Universalis[118X, [19X54[119X, 3 (2005), 259–271.
  
  [[20XSZ12[120X]   [16XSlattery,   M.  and  Zenisek,  A.[116X,  [17XMoufang  loops  of  order  243[117X,
  [18XCommentationes Mathematicae Universitatis Carolinae[118X, [19X53[119X, 3 (2012), 423–428.
  
  [[20XSV17[120X]  [16XStuhl,  I.  and  Vojtěchovský,  P.[116X, [17XInvolutory latin quandles, Bruck
  loops  and  commutative automorphic loops of odd prime power order[117X, [18X[118X (2017),
  ((preprint)).
  
  [[20XVoj06[120X]  [16XVojtěchovský,  P.[116X,  [17XToward  the  classification of Moufang loops of
  order 64[117X, [18XEuropean J. Combin.[118X, [19X27[119X, 3 (2006), 444–460.
  
  [[20XVoj15[120X]  [16XVojtěchovský,  P.[116X, [17XThree lectures on automorphic loops[117X, [18XQuasigroups
  Related Systems[118X, [19X23[119X, 1 (2015), 129–163.
  
  [[20XWJ75[120X]  [16XWilson  Jr.,  R.  L.[116X,  [17XQuasidirect  products  of  quasigroups[117X, [18XComm.
  Algebra[118X, [19X3[119X, 9 (1975), 835–850.
  
  
  
  [32X
