  
  
  [1XReferences[101X
  
  [[20XBen76[120X] [16XBenard, M.[116X, [17XSchur indices and cyclic defect groups[117X, [18XAnn. of Math. (2)
  [118X, [19X103[119X, 2 (1976), 283–304.
  
  [[20XBS72[120X]  [16XBenard, M. and Schacher, M.[116X, [17XThe Schur subgroup. II.[117X, [18XJ. Algebra[118X, [19X22[119X,
  1 (1972), 378–385.
  
  [[20XBR07[120X]  [16XBroche,  O. and del Río, Á.[116X, [17XWedderburn decomposition of finite group
  algebras[117X, [18XFinite Fields Appl.[118X, [19X13[119X, 1 (2007), 71–79.
  
  [[20XJan75[120X] [16XJanusz, G.[116X, [17XGenerators for the Schur group of local and global number
  fields[117X, [18XPacific J. Math.[118X, [19X56[119X, 2 (1975), 525–546.
  
  [[20XNav98[120X]   [16XNavarro,  G.[116X,  [17XCharacters  and  Blocks  of  Finite  Groups[117X,  London
  Mathematical  Society,  Lecture Note Series, [19X250[119X, Cambridge, UK (1998), x+287
  pages.
  
  [[20XOR03[120X]  [16XOlivieri,  A.  and del Río, Á.[116X, [17XAn algorithm to compute the primitive
  central  idempotents  and  the  Wedderburn  decomposition of a rational group
  algebra[117X, [18XJ. Symbolic Comput.[118X, [19X35[119X, 6 (2003), 673–687.
  
  [[20XORS04[120X]  [16XOlivieri,  A.,  del Río, Á. and Simón, J. J.[116X, [17XOn monomial characters
  and  central  idempotents  of  rational  group algebras[117X, [18XComm. Algebra[118X, [19X32[119X, 4
  (2004), 1531–1550.
  
  [[20XOlt07[120X] [16XOlteanu, G.[116X, [17XComputing the Wedderburn decomposition of group algebras
  by   the   Brauer-Witt  theorem[117X,  [18XMath.  Comp.[118X,  [19X76[119X,  258  (2007),  1073–1087
  (electronic).
  
  [[20XOG11[120X]  [16XOlteanu,  G.  and  Van Gelder, I.[116X, [17XFinite group algebras of nilpotent
  groups:  A  complete  set  of orthogonal primitive idempotents[117X, [18XFinite Fields
  Appl.[118X, [19X17[119X, 2 (2011), 157–165.
  
  [[20XOGnt[120X]  [16XOlteanu,  G.  and Van Gelder, I.[116X, [17XConstruction of minimal non-abelian
  left group codes[117X (preprint).
  
  [[20XPas89[120X]  [16XPassman, D. S.[116X, [17XInfinite crossed products[117X, Academic Press Inc., Pure
  and Applied Mathematics, [19X135[119X, Boston, MA (1989), xii+468 pages.
  
  [[20XPie82[120X]  [16XPierce, R. S.[116X, [17XAssociative Algebras[117X, Springer Verlag, Graduate Texts
  in Mathematics, [19X88[119X, New York - Berlin (1982), xii+436 pages.
  
  [[20XRei03[120X]  [16XReiner,  I.[116X,  [17XMaximal  orders[117X, The Clarendon Press Oxford University
  Press, London Mathematical Society Monographs. New Series, [19X28[119X, Oxford (2003),
  xiv+395  pages,  ((Corrected reprint of the 1975 original, With a foreword by
  M. J. Taylor)).
  
  [[20XRS96[120X]  [16XRiese,  U.  and  Schmid,  P.[116X, [17XSchur indices and Schur groups, II [117X, [18XJ.
  Algebra[118X, [19X182[119X, 1 (1996), 183–200.
  
  [[20XSch94[120X]  [16XSchmid,  P.[116X,  [17XSchur  indices  and Schur groups [117X, [18XJ. Algebra[118X, [19X169[119X, 15
  (1994), 226–247.
  
  [[20XSho33[120X]  [16XShoda, K.[116X, [17XÜber die monomialen Darstellungen einer endlichen Gruppe[117X,
  [18XProc. Phys.-Math. Soc. Japan[118X, [19XIII[119X, 15 (1933), 249–257.
  
  [[20XYam74[120X]  [16XYamada, T.[116X, [17XThe Schur subgroup of the Brauer group[117X, Springer-Verlag,
  Berlin (1974), v+159 pages, ((Lecture Notes in Mathematics, Vol. 397)).
  
  
  
  [32X
