  
  
                                     [1m[4m[31m[1mSophus[1m[4m[31m[0m
  
  
                      [1m[4m[31mComputing in nilpotent Lie algebras[0m
  
  
                                  Version 1.23
  
  
                                 February 2006
  
  
                                Csaba Schneider
  
  
  
  Csaba Schneider
      Email:    [34mmailto:csaba.schneider@sztaki.hu[0m
      Homepage: [34mhttp://www.sztaki.hu/~schneider[0m
      Address:  Informatics Laboratory
                Computer and Automation Research Institute
                The Hungarian Academy of Sciences
                1111 Budapest, L\'agym\'anyosi u.\ 11.
                Hungary
  
  
  
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  [1m[4m[31mAbstract[0m
  [1mSophus[0m is a GAP~4 package to compute with nilpotent Lie algebras over finite
  prime  fields.  In  particular,  the  package can be used to compute certain
  central  extensions  and the automorphism group of such Lie algebras. [1mSophus[0m
  also  enables  its  user  to  test  isomorphism  between  two  nilpotent Lie
  algebras. The author of the package used it to construct all Lie algebras of
  dimension at most~9 over $\mathbb F_2$
  
  
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  [1m[4m[31mCopyright[0m
  (C) 2004, 2005 Csaba Schneider
  
  
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  [1m[4m[31mAcknowledgements[0m
  Most  of  the  work  on this package was carried out while I held a research
  position  at  the  Technische  Universtit\"at  Braunschweig. I would like to
  express  my  gratitude  to  the staff and the students of the Institut f\"ur
  Geometrie for their interest in this work. Special thanks go to Bettina Eick
  for her r\^ole in completing this project.
  
  
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  [1m[4m[31mContent (Sophus)[0m
  
  1. The theory
  2. A sample calculation with [1mSophus[0m
  3. [1mSophus[0m functions
    3.1 Some general functions to compute with Lie algebras
      3.1-1 SophusTest
      3.1-2 IsLieNilpotentOverFp
      3.1-3 MinimalGeneratorNumber
      3.1-4 AbelianLieAlgebra
    3.2 Functions to compute with nilpotent bases
      3.2-1 NilpotentBasis
      3.2-2 LieNBWeights
      3.2-3 LieNBDefinitions
      3.2-4 IsNilpotentBasis
      3.2-5 IsLieAlgebraWithNB
    3.3 The cover
      3.3-1 LieCover
      3.3-2 CoverHomomorphism
      3.3-3 CoverOf
      3.3-4 IsLieCover
      3.3-5 LieMultiplicator
      3.3-6 LieNucleus
    3.4 Automorphisms of nilpotent Lie algebras
      3.4-1 NilpotentLieAutomorphism
      3.4-2 IdentityNilpotentLieAutomorphism
      3.4-3 IsNilpotentLieAutomorphism
    3.5 Automorphism group and isomorphism testing
      3.5-1 AutomorphismGroup
      3.5-2 AutomorphismGroupNilpotentLieAlgebra
      3.5-3 AreIsomorphicNilpotentLieAlgebras
    3.6 Descendants
      3.6-1 Descendants
      3.6-2 DescendantsOfStep1OfAbelianLieAlgebra
    3.7 Input and output
      3.7-1 WriteLieAlgebraToString
      3.7-2 ReadStringToNilpotentLieAlgebra
      3.7-3 WriteLieAlgebraListToFile
      3.7-4 SophusBuildManual
      3.7-5 SophusBuildManualHTML
  
  
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