  
  [1X5 [33X[0;0YFunctions for Character Table Constructions[133X[101X
  
  [33X[0;0YThe  functions  described  in  this  chapter  deal  with the construction of
  character  tables  from other character tables. So they fit to the functions
  in Section [14X'Reference: Constructing Character Tables from Others'[114X. But since
  they  are  used  in  situations that are typical for the [5XGAP[105X Character Table
  Library, they are described here.[133X
  
  [33X[0;0YAn  important  ingredient  of  the  constructions  is the description of the
  action of a group automorphism on the classes by a permutation. In practice,
  these  permutations are usually chosen from the group of table automorphisms
  of  the  character  table  in question, see [2XAutomorphismsOfTable[102X ([14XReference:
  AutomorphismsOfTable[114X).[133X
  
  [33X[0;0YSection [14X5.1[114X  deals  with  groups  of  the structure [22XM.G.A[122X, where the upwards
  extension  [22XG.A[122X acts suitably on the central extension [22XM.G[122X. Section [14X5.2[114X deals
  with  groups  that  have  a factor group of type [22XS_3[122X. Section [14X5.3[114X deals with
  upward  extensions  of a group by a Klein four group. Section [14X5.4[114X deals with
  downward  extensions of a group by a Klein four group. Section [14X5.6[114X describes
  the  construction  of  certain Brauer tables. Section [14X5.7[114X deals with special
  cases  of  the  construction  of character tables of central extensions from
  known  character tables of suitable factor groups. Section [14X5.8[114X documents the
  functions used to encode certain tables in the [5XGAP[105X Character Table Library.[133X
  
  [33X[0;0YExamples can be found in [Breb] and [Bref].[133X
  
  
  [1X5.1 [33X[0;0YCharacter Tables of Groups of Structure [22XM.G.A[122X[101X[1X[133X[101X
  
  [33X[0;0YFor  the functions in this section, let [22XH[122X be a group with normal subgroups [22XN[122X
  and  [22XM[122X  such that [22XH/N[122X is cyclic, [22XM ≤ N[122X holds, and such that each irreducible
  character  of [22XN[122X that does not contain [22XM[122X in its kernel induces irreducibly to
  [22XH[122X. (This is satisfied for example if [22XN[122X has prime index in [22XH[122X and [22XM[122X is a group
  of  prime order that is central in [22XN[122X but not in [22XH[122X.) Let [22XG = N/M[122X and [22XA = H/N[122X,
  so [22XH[122X has the structure [22XM.G.A[122X. For some examples, see [Bre11].[133X
  
  [1X5.1-1 PossibleCharacterTablesOfTypeMGA[101X
  
  [33X[1;0Y[29X[2XPossibleCharacterTablesOfTypeMGA[102X( [3XtblMG[103X, [3XtblG[103X, [3XtblGA[103X, [3Xorbs[103X, [3Xidentifier[103X ) [32X function[133X
  
  [33X[0;0YLet [22XH[122X, [22XN[122X, and [22XM[122X be as described at the beginning of the section.[133X
  
  [33X[0;0YLet  [3XtblMG[103X, [3XtblG[103X, [3XtblGA[103X be the ordinary character tables of the groups [22XM.G =
  N[122X,  [22XG[122X,  and  [22XG.A  = H/M[122X, respectively, and [3Xorbs[103X be the list of orbits on the
  class  positions  of  [3XtblMG[103X  that  is  induced  by  the  action of [22XH[122X on [22XM.G[122X.
  Furthermore, let the class fusions from [3XtblMG[103X to [3XtblG[103X and from [3XtblG[103X to [3XtblGA[103X
  be  stored  on  [3XtblMG[103X  and  [3XtblG[103X,  respectively (see [2XStoreFusion[102X ([14XReference:
  StoreFusion[114X)).[133X
  
  [33X[0;0Y[2XPossibleCharacterTablesOfTypeMGA[102X  returns  a  list of records describing all
  possible ordinary character tables for groups [22XH[122X that are compatible with the
  arguments.  Note that in general there may be several possible groups [22XH[122X, and
  it  may  also  be  that  [21Xcharacter tables[121X are constructed for which no group
  exists.[133X
  
  [33X[0;0YEach of the records in the result has the following components.[133X
  
  [8X[10Xtable[110X[8X[108X
        [33X[0;6Ya possible ordinary character table for [22XH[122X, and[133X
  
  [8X[10XMGfusMGA[110X[8X[108X
        [33X[0;6Ythe fusion map from [3XtblMG[103X into the table stored in [10Xtable[110X.[133X
  
  [33X[0;0YThe  possible  tables  differ  w. r. t. some power maps, and perhaps element
  orders and table automorphisms; in particular, the [10XMGfusMGA[110X component is the
  same in all records.[133X
  
  [33X[0;0YThe returned tables have the [2XIdentifier[102X ([14XReference: Identifier for character
  tables[114X) value [3Xidentifier[103X. The classes of these tables are sorted as follows.
  First  come the classes contained in [22XM.G[122X, sorted compatibly with the classes
  in  [3XtblMG[103X,  then  the classes in [22XH ∖ M.G[122X follow, in the same ordering as the
  classes of [22XG.A ∖ G[122X.[133X
  
  [1X5.1-2 BrauerTableOfTypeMGA[101X
  
  [33X[1;0Y[29X[2XBrauerTableOfTypeMGA[102X( [3XmodtblMG[103X, [3XmodtblGA[103X, [3XordtblMGA[103X ) [32X function[133X
  
  [33X[0;0YLet  [22XH[122X,  [22XN[122X,  and  [22XM[122X  be  as  described  at the beginning of the section, let
  [3XmodtblMG[103X  and [3XmodtblGA[103X be the [22Xp[122X-modular character tables of the groups [22XN[122X and
  [22XH/M[122X, respectively, and let [3XordtblMGA[103X be the [22Xp[122X-modular Brauer table of [22XH[122X, for
  some  prime  integer [22Xp[122X. Furthermore, let the class fusions from the ordinary
  character  table of [3XmodtblMG[103X to [3XordtblMGA[103X and from [3XordtblMGA[103X to the ordinary
  character table of [3XmodtblGA[103X be stored.[133X
  
  [33X[0;0Y[2XBrauerTableOfTypeMGA[102X returns the [22Xp[122X-modular character table of [22XH[122X.[133X
  
  [1X5.1-3 PossibleActionsForTypeMGA[101X
  
  [33X[1;0Y[29X[2XPossibleActionsForTypeMGA[102X( [3XtblMG[103X, [3XtblG[103X, [3XtblGA[103X ) [32X function[133X
  
  [33X[0;0YLet  the  arguments  be  as  described  for [2XPossibleCharacterTablesOfTypeMGA[102X
  ([14X5.1-1[114X).  [2XPossibleActionsForTypeMGA[102X returns the set of orbit structures [22XΩ[122X on
  the  class  positions of [3XtblMG[103X that can be induced by the action of [22XH[122X on the
  classes  of  [22XM.G[122X  in  the  sense  that  [22XΩ[122X  is  the  set of orbits of a table
  automorphism      of     [3XtblMG[103X     (see [2XAutomorphismsOfTable[102X     ([14XReference:
  AutomorphismsOfTable[114X)) that is compatible with the stored class fusions from
  [3XtblMG[103X  to  [3XtblG[103X  and  from [3XtblG[103X to [3XtblGA[103X. Note that the number of such orbit
  structures   can  be  smaller  than  the  number  of  the  underlying  table
  automorphisms.[133X
  
  [33X[0;0YInformation   about   the   progress  is  reported  if  the  info  level  of
  [2XInfoCharacterTable[102X   ([14XReference:   InfoCharacterTable[114X)   is   at   least   [22X1[122X
  (see [2XSetInfoLevel[102X ([14XReference: InfoLevel[114X)).[133X
  
  
  [1X5.2 [33X[0;0YCharacter Tables of Groups of Structure [22XG.S_3[122X[101X[1X[133X[101X
  
  
  [1X5.2-1 [33X[0;0YCharacterTableOfTypeGS3[133X[101X
  
  [33X[1;0Y[29X[2XCharacterTableOfTypeGS3[102X( [3Xtbl[103X, [3Xtbl2[103X, [3Xtbl3[103X, [3Xaut[103X, [3Xidentifier[103X ) [32X function[133X
  [33X[1;0Y[29X[2XCharacterTableOfTypeGS3[102X( [3Xmodtbl[103X, [3Xmodtbl2[103X, [3Xmodtbl3[103X, [3Xordtbls3[103X, [3Xidentifier[103X ) [32X function[133X
  
  [33X[0;0YLet [22XH[122X be a group with a normal subgroup [22XG[122X such that [22XH/G ≅ S_3[122X, the symmetric
  group  on  three  points,  and  let [22XG.2[122X and [22XG.3[122X be preimages of subgroups of
  order  [22X2[122X  and [22X3[122X, respectively, under the natural projection onto this factor
  group.[133X
  
  [33X[0;0YIn  the  first form, let [3Xtbl[103X, [3Xtbl2[103X, [3Xtbl3[103X be the ordinary character tables of
  the  groups  [22XG[122X,  [22XG.2[122X,  and  [22XG.3[122X, respectively, and [3Xaut[103X be the permutation of
  classes  of  [3Xtbl3[103X induced by the action of [22XH[122X on [22XG.3[122X. Furthermore assume that
  the   class   fusions   from  [3Xtbl[103X  to  [3Xtbl2[103X  and  [3Xtbl3[103X  are  stored  on  [3Xtbl[103X
  (see [2XStoreFusion[102X  ([14XReference:  StoreFusion[114X)).  In  particular, the two class
  fusions  must  be  compatible  in  the  sense that the induced action on the
  classes of [3Xtbl[103X describes an action of [22XS_3[122X.[133X
  
  [33X[0;0YIn  the second form, let [3Xmodtbl[103X, [3Xmodtbl2[103X, [3Xmodtbl3[103X be the [22Xp[122X-modular character
  tables  of  the  groups  [22XG[122X,  [22XG.2[122X, and [22XG.3[122X, respectively, and [3Xordtbls3[103X be the
  ordinary character table of [22XH[122X.[133X
  
  [33X[0;0Y[2XCharacterTableOfTypeGS3[102X returns a record with the following components.[133X
  
  [8X[10Xtable[110X[8X[108X
        [33X[0;6Ythe ordinary or [22Xp[122X-modular character table of [22XH[122X, respectively,[133X
  
  [8X[10Xtbl2fustbls3[110X[8X[108X
        [33X[0;6Ythe fusion map from [3Xtbl2[103X into the table of [22XH[122X, and[133X
  
  [8X[10Xtbl3fustbls3[110X[8X[108X
        [33X[0;6Ythe fusion map from [3Xtbl3[103X into the table of [22XH[122X.[133X
  
  [33X[0;0YThe  returned  table  of  [22XH[122X  has  the  [2XIdentifier[102X ([14XReference: Identifier for
  character tables[114X) value [3Xidentifier[103X. The classes of the table of [22XH[122X are sorted
  as  follows. First come the classes contained in [22XG.3[122X, sorted compatibly with
  the  classes  in  [3Xtbl3[103X,  then  the  classes  in  [22XH ∖ G.3[122X follow, in the same
  ordering as the classes of [22XG.2 ∖ G[122X.[133X
  
  [33X[0;0YIn  fact  the  code  is  applicable  in  the more general case that [22XH/G[122X is a
  Frobenius  group  [22XF  =  K C[122X with abelian kernel [22XK[122X and cyclic complement [22XC[122X of
  prime  order,  see [Bref].  Besides  [22XF  =  S_3[122X,  e. g.,  the case [22XF = A_4[122X is
  interesting.[133X
  
  [1X5.2-2 PossibleActionsForTypeGS3[101X
  
  [33X[1;0Y[29X[2XPossibleActionsForTypeGS3[102X( [3Xtbl[103X, [3Xtbl2[103X, [3Xtbl3[103X ) [32X function[133X
  
  [33X[0;0YLet  the  arguments  be  as  described  for [2XCharacterTableOfTypeGS3[102X ([14X5.2-1[114X).
  [2XPossibleActionsForTypeGS3[102X  returns  the  set  of  those  table automorphisms
  (see [2XAutomorphismsOfTable[102X  ([14XReference:  AutomorphismsOfTable[114X))  of [3Xtbl3[103X that
  can be induced by the action of [22XH[122X on the classes of [3Xtbl3[103X.[133X
  
  [33X[0;0YInformation   about   the   progress  is  reported  if  the  info  level  of
  [2XInfoCharacterTable[102X   ([14XReference:   InfoCharacterTable[114X)   is   at   least   [22X1[122X
  (see [2XSetInfoLevel[102X ([14XReference: InfoLevel[114X)).[133X
  
  
  [1X5.3 [33X[0;0YCharacter Tables of Groups of Structure [22XG.2^2[122X[101X[1X[133X[101X
  
  [33X[0;0YThe  following  functions are thought for constructing the possible ordinary
  character  tables of a group of structure [22XG.2^2[122X from the known tables of the
  three normal subgroups of type [22XG.2[122X.[133X
  
  
  [1X5.3-1 [33X[0;0YPossibleCharacterTablesOfTypeGV4[133X[101X
  
  [33X[1;0Y[29X[2XPossibleCharacterTablesOfTypeGV4[102X( [3XtblG[103X, [3XtblsG2[103X, [3Xacts[103X, [3Xidentifier[103X[, [3XtblGfustblsG2[103X] ) [32X function[133X
  [33X[1;0Y[29X[2XPossibleCharacterTablesOfTypeGV4[102X( [3XmodtblG[103X, [3XmodtblsG2[103X, [3XordtblGV4[103X[, [3XordtblsG2fusordtblG4[103X] ) [32X function[133X
  
  [33X[0;0YLet  [22XH[122X  be  a  group  with a normal subgroup [22XG[122X such that [22XH/G[122X is a Klein four
  group,  and  let [22XG.2_1[122X, [22XG.2_2[122X, and [22XG.2_3[122X be the three subgroups of index two
  in [22XH[122X that contain [22XG[122X.[133X
  
  [33X[0;0YIn  the  first  version,  let [3XtblG[103X be the ordinary character table of [22XG[122X, let
  [3XtblsG2[103X  be a list containing the three character tables of the groups [22XG.2_i[122X,
  and  let  [3Xacts[103X be a list of three permutations describing the action of [22XH[122X on
  the  conjugacy  classes  of the corresponding tables in [3XtblsG2[103X. If the class
  fusions  from  [3XtblG[103X  into  the  tables in [3XtblsG2[103X are not stored on [3XtblG[103X (for
  example,  because  the  three  tables are equal) then the three maps must be
  entered in the list [3XtblGfustblsG2[103X.[133X
  
  [33X[0;0YIn  the  second  version, let [3XmodtblG[103X be the [22Xp[122X-modular character table of [22XG[122X,
  [3XmodtblsG[103X  be  the  list  of [22Xp[122X-modular Brauer tables of the groups [22XG.2_i[122X, and
  [3XordtblGV4[103X  be  the  ordinary  character  table of [22XH[122X. In this case, the class
  fusions  from the ordinary character tables of the groups [22XG.2_i[122X to [3XordtblGV4[103X
  can be entered in the list [3XordtblsG2fusordtblG4[103X.[133X
  
  [33X[0;0Y[2XPossibleCharacterTablesOfTypeGV4[102X  returns  a  list of records describing all
  possible  (ordinary  or  [22Xp[122X-modular)  character  tables for groups [22XH[122X that are
  compatible  with  the  arguments.  Note that in general there may be several
  possible  groups [22XH[122X, and it may also be that [21Xcharacter tables[121X are constructed
  for  which  no  group  exists.  Each  of  the  records in the result has the
  following components.[133X
  
  [8X[10Xtable[110X[8X[108X
        [33X[0;6Ya possible (ordinary or [22Xp[122X-modular) character table for [22XH[122X, and[133X
  
  [8X[10XG2fusGV4[110X[8X[108X
        [33X[0;6Ythe  list  of  fusion  maps  from  the tables in [3XtblsG2[103X into the [10Xtable[110X
        component.[133X
  
  [33X[0;0YThe possible tables differ w.r.t. the irreducible characters and perhaps the
  table  automorphisms;  in  particular, the [10XG2fusGV4[110X component is the same in
  all records.[133X
  
  [33X[0;0YThe returned tables have the [2XIdentifier[102X ([14XReference: Identifier for character
  tables[114X) value [3Xidentifier[103X. The classes of these tables are sorted as follows.
  First come the classes contained in [22XG[122X, sorted compatibly with the classes in
  [3XtblG[103X,  then  the  outer  classes in the tables in [3XtblsG2[103X follow, in the same
  ordering as in these tables.[133X
  
  [1X5.3-2 PossibleActionsForTypeGV4[101X
  
  [33X[1;0Y[29X[2XPossibleActionsForTypeGV4[102X( [3XtblG[103X, [3XtblsG2[103X ) [32X function[133X
  
  [33X[0;0YLet  the  arguments  be  as  described  for [2XPossibleCharacterTablesOfTypeGV4[102X
  ([14X5.3-1[114X).  [2XPossibleActionsForTypeGV4[102X returns the list of those triples [22X[ π_1,
  π_2,  π_3  ][122X  of  permutations  for  which a group [22XH[122X may exist that contains
  [22XG.2_1[122X,  [22XG.2_2[122X,  [22XG.2_3[122X  as  index  [22X2[122X subgroups which intersect in the index [22X4[122X
  subgroup [22XG[122X.[133X
  
  [33X[0;0YInformation   about   the   progress   is   reported   if   the   level   of
  [2XInfoCharacterTable[102X   ([14XReference:   InfoCharacterTable[114X)   is   at   least   [22X1[122X
  (see [2XSetInfoLevel[102X ([14XReference: InfoLevel[114X)).[133X
  
  
  [1X5.4 [33X[0;0YCharacter Tables of Groups of Structure [22X2^2.G[122X[101X[1X[133X[101X
  
  [33X[0;0YThe  following  functions are thought for constructing the possible ordinary
  or  Brauer  character  tables  of  a group of structure [22X2^2.G[122X from the known
  tables  of  the three factor groups modulo the normal order two subgroups in
  the central Klein four group.[133X
  
  [33X[0;0YNote that in the ordinary case, only a list of possibilities can be computed
  whereas  in  the modular case, where the ordinary character table is assumed
  to be known, the desired table is uniquely determined.[133X
  
  
  [1X5.4-1 [33X[0;0YPossibleCharacterTablesOfTypeV4G[133X[101X
  
  [33X[1;0Y[29X[2XPossibleCharacterTablesOfTypeV4G[102X( [3XtblG[103X, [3Xtbls2G[103X, [3Xid[103X[, [3Xfusions[103X] ) [32X function[133X
  [33X[1;0Y[29X[2XPossibleCharacterTablesOfTypeV4G[102X( [3XtblG[103X, [3Xtbl2G[103X, [3Xaut[103X, [3Xid[103X ) [32X function[133X
  
  [33X[0;0YLet  [22XH[122X  be  a group with a central subgroup [22XN[122X of type [22X2^2[122X, and let [22XZ_1[122X, [22XZ_2[122X,
  [22XZ_3[122X be the order [22X2[122X subgroups of [22XN[122X.[133X
  
  [33X[0;0YIn  the  first  form,  let  [3XtblG[103X be the ordinary character table of [22XH/N[122X, and
  [3Xtbls2G[103X  be  a list of length three, the entries being the ordinary character
  tables  of  the  groups [22XH/Z_i[122X. In the second form, let [3Xtbl2G[103X be the ordinary
  character  table  of [22XH/Z_1[122X and [3Xaut[103X be a permutation; here it is assumed that
  the  groups  [22XZ_i[122X  are  permuted under an automorphism [22Xσ[122X of order [22X3[122X of [22XH[122X, and
  that [22Xσ[122X induces the permutation [3Xaut[103X on the classes of [3XtblG[103X.[133X
  
  [33X[0;0YThe class fusions onto [3XtblG[103X are assumed to be stored on the tables in [3Xtbls2G[103X
  or  [3Xtbl2G[103X,  respectively,  except  if  they  are  explicitly entered via the
  optional argument [3Xfusions[103X.[133X
  
  [33X[0;0Y[2XPossibleCharacterTablesOfTypeV4G[102X  returns the list of all possible character
  tables  for  [22XH[122X  in  this  situation. The returned tables have the [2XIdentifier[102X
  ([14XReference: Identifier for character tables[114X) value [3Xid[103X.[133X
  
  
  [1X5.4-2 [33X[0;0YBrauerTableOfTypeV4G[133X[101X
  
  [33X[1;0Y[29X[2XBrauerTableOfTypeV4G[102X( [3XordtblV4G[103X, [3Xmodtbls2G[103X ) [32X function[133X
  [33X[1;0Y[29X[2XBrauerTableOfTypeV4G[102X( [3XordtblV4G[103X, [3Xmodtbl2G[103X, [3Xaut[103X ) [32X function[133X
  
  [33X[0;0YLet [22XH[122X be a group with a central subgroup [22XN[122X of type [22X2^2[122X, and let [3XordtblV4G[103X be
  the  ordinary  character  table  of  [22XH[122X.  Let  [22XZ_1[122X,  [22XZ_2[122X,  [22XZ_3[122X be the order [22X2[122X
  subgroups  of  [22XN[122X.  In  the  first  form,  let  [3Xmodtbls2G[103X  be the list of the
  [22Xp[122X-modular  Brauer  tables  of the factor groups [22XH/Z_1[122X, [22XH/Z_2[122X, and [22XH/Z_3[122X, for
  some  prime  integer  [22Xp[122X.  In  the second form, let [3Xmodtbl2G[103X be the [22Xp[122X-modular
  Brauer  table of [22XH/Z_1[122X and [3Xaut[103X be a permutation; here it is assumed that the
  groups  [22XZ_i[122X are permuted under an automorphism [22Xσ[122X of order [22X3[122X of [22XH[122X, and that [22Xσ[122X
  induces  the  permutation [3Xaut[103X on the classes of the ordinary character table
  of [22XH[122X that is stored in [3XordtblV4G[103X.[133X
  
  [33X[0;0YThe  class  fusions  from  [3XordtblV4G[103X to the ordinary character tables of the
  tables in [3Xmodtbls2G[103X or [3Xmodtbl2G[103X are assumed to be stored.[133X
  
  [33X[0;0Y[2XBrauerTableOfTypeV4G[102X returns the [22Xp[122X-modular character table of [22XH[122X.[133X
  
  
  [1X5.5 [33X[0;0YCharacter Tables of Subdirect Products of Index Two[133X[101X
  
  [33X[0;0YThe  following function is thought for constructing the (ordinary or Brauer)
  character  tables of certain subdirect products from the known tables of the
  factor groups and normal subgroups involved.[133X
  
  [1X5.5-1 CharacterTableOfIndexTwoSubdirectProduct[101X
  
  [33X[1;0Y[29X[2XCharacterTableOfIndexTwoSubdirectProduct[102X( [3XtblH1[103X, [3XtblG1[103X, [3XtblH2[103X, [3XtblG2[103X, [3Xidentifier[103X ) [32X function[133X
  [6XReturns:[106X  [33X[0;10Ya record containing the character table of the subdirect product [22XG[122X
            that is described by the first four arguments.[133X
  
  [33X[0;0YLet  [3XtblH1[103X,  [3XtblG1[103X, [3XtblH2[103X, [3XtblG2[103X be the character tables of groups [22XH_1[122X, [22XG_1[122X,
  [22XH_2[122X, [22XG_2[122X, such that [22XH_1[122X and [22XH_2[122X have index two in [22XG_1[122X and [22XG_2[122X, respectively,
  and such that the class fusions corresponding to these embeddings are stored
  on [3XtblH1[103X and [3XtblH1[103X, respectively.[133X
  
  [33X[0;0YIn  this  situation,  the  direct  product  of [22XG_1[122X and [22XG_2[122X contains a unique
  subgroup  [22XG[122X of index two that contains the direct product of [22XH_1[122X and [22XH_2[122X but
  does not contain any of the groups [22XG_1[122X, [22XG_2[122X.[133X
  
  [33X[0;0YThe  function [2XCharacterTableOfIndexTwoSubdirectProduct[102X returns a record with
  the following components.[133X
  
  [8X[10Xtable[110X[8X[108X
        [33X[0;6Ythe character table of [22XG[122X,[133X
  
  [8X[10XH1fusG[110X[8X[108X
        [33X[0;6Ythe class fusion from [3XtblH1[103X into the table of [22XG[122X, and[133X
  
  [8X[10XH2fusG[110X[8X[108X
        [33X[0;6Ythe class fusion from [3XtblH2[103X into the table of [22XG[122X.[133X
  
  [33X[0;0YIf  the  first  four  arguments are [13Xordinary[113X character tables then the fifth
  argument  [3Xidentifier[103X  must  be  a  string;  this  is  used as the [2XIdentifier[102X
  ([14XReference: Identifier for character tables[114X) value of the result table.[133X
  
  [33X[0;0YIf  the  first  four  arguments  are  [13XBrauer[113X  character  tables for the same
  characteristic  then the fifth argument must be the ordinary character table
  of the desired subdirect product.[133X
  
  [1X5.5-2 ConstructIndexTwoSubdirectProduct[101X
  
  [33X[1;0Y[29X[2XConstructIndexTwoSubdirectProduct[102X( [3Xtbl[103X, [3XtblH1[103X, [3XtblG1[103X, [3XtblH2[103X, [3XtblG2[103X, [3Xpermclasses[103X, [3Xpermchars[103X ) [32X function[133X
  
  [33X[0;0Y[2XConstructIndexTwoSubdirectProduct[102X  constructs  the irreducible characters of
  the  ordinary  character  table [3Xtbl[103X of the subdirect product of index two in
  the  direct product of [3XtblG1[103X and [3XtblG2[103X, which contains the direct product of
  [3XtblH1[103X and [3XtblH2[103X but does not contain any of the direct factors [3XtblG1[103X, [3XtblG2[103X.
  W. r. t. the    default    ordering    obtained    from    that   given   by
  [2XCharacterTableDirectProduct[102X  ([14XReference:  CharacterTableDirectProduct[114X),  the
  columns  and  the  rows  of the matrix of irreducibles are permuted with the
  permutations [3Xpermclasses[103X and [3Xpermchars[103X, respectively.[133X
  
  [1X5.5-3 ConstructIndexTwoSubdirectProductInfo[101X
  
  [33X[1;0Y[29X[2XConstructIndexTwoSubdirectProductInfo[102X( [3Xtbl[103X[, [3XtblH1[103X, [3XtblG1[103X, [3XtblH2[103X, [3XtblG2[103X] ) [32X function[133X
  [6XReturns:[106X  [33X[0;10Ya   list   of   constriction   descriptions,   or  a  construction
            description, or [9Xfail[109X.[133X
  
  [33X[0;0YCalled  with  one  argument [3Xtbl[103X, an ordinary character table of the group [22XG[122X,
  say,  [2XConstructIndexTwoSubdirectProductInfo[102X  analyzes  the  possibilities to
  construct  [3Xtbl[103X from character tables of subgroups [22XH_1[122X, [22XH_2[122X and factor groups
  [22XG_1[122X, [22XG_2[122X, using [2XCharacterTableOfIndexTwoSubdirectProduct[102X ([14X5.5-1[114X). The return
  value is a list of records with the following components.[133X
  
  [8X[10Xkernels[110X[8X[108X
        [33X[0;6Ythe list of class positions of [22XH_1[122X, [22XH_2[122X in [3Xtbl[103X,[133X
  
  [8X[10Xkernelsizes[110X[8X[108X
        [33X[0;6Ythe list of orders of [22XH_1[122X, [22XH_2[122X,[133X
  
  [8X[10Xfactors[110X[8X[108X
        [33X[0;6Ythe  list  of  [2XIdentifier[102X ([14XReference: Identifier for character tables[114X)
        values  of the [5XGAP[105X library tables of the factors [22XG_2[122X, [22XG_1[122X of [22XG[122X by [22XH_1[122X,
        [22XH_2[122X; if no such table is available then the entry is [9Xfail[109X, and[133X
  
  [8X[10Xsubgroups[110X[8X[108X
        [33X[0;6Ythe  list  of  [2XIdentifier[102X ([14XReference: Identifier for character tables[114X)
        values of the [5XGAP[105X library tables of the subgroups [22XH_2[122X, [22XH_1[122X of [22XG[122X; if no
        such tables are available then the entries are [9Xfail[109X.[133X
  
  [33X[0;0YIf  the  returned  list  is  empty then either [3Xtbl[103X does not have the desired
  structure  as  a  subdirect  product,  [13Xor[113X [3Xtbl[103X is in fact a nontrivial direct
  product.[133X
  
  [33X[0;0YCalled  with  five  arguments, the ordinary character tables of [22XG[122X, [22XH_1[122X, [22XG_1[122X,
  [22XH_2[122X,  [22XG_2[122X,  [2XConstructIndexTwoSubdirectProductInfo[102X returns a list that can be
  used  as  the [2XConstructionInfoCharacterTable[102X ([14X3.7-4[114X) value for the character
  table    of    [22XG[122X    from    the    other   four   character   tables   using
  [2XCharacterTableOfIndexTwoSubdirectProduct[102X  ([14X5.5-1[114X);  if  this is not possible
  then [9Xfail[109X is returned.[133X
  
  
  [1X5.6 [33X[0;0YBrauer Tables of Extensions by [22Xp[122X[101X[1X-regular Automorphisms[133X[101X
  
  [33X[0;0YAs  for  the  construction of Brauer character tables from known tables, the
  functions  [2XPossibleCharacterTablesOfTypeMGA[102X ([14X5.1-1[114X), [2XCharacterTableOfTypeGS3[102X
  ([14X5.2-1[114X), and [2XPossibleCharacterTablesOfTypeGV4[102X ([14X5.3-1[114X) work for both ordinary
  and  Brauer  tables. The following function is designed specially for Brauer
  tables.[133X
  
  [1X5.6-1 IBrOfExtensionBySingularAutomorphism[101X
  
  [33X[1;0Y[29X[2XIBrOfExtensionBySingularAutomorphism[102X( [3Xmodtbl[103X, [3Xact[103X ) [32X function[133X
  
  [33X[0;0YLet [3Xmodtbl[103X be a [22Xp[122X-modular Brauer table of the group [22XG[122X, say, and suppose that
  the group [22XH[122X, say, is an upward extension of [22XG[122X by an automorphism of order [22Xp[122X.[133X
  
  [33X[0;0YThe second argument [3Xact[103X describes the action of this automorphism. It can be
  either  a permutation of the columns of [3Xmodtbl[103X, or a list of the [22XH[122X-orbits on
  the  columns  of  [3Xmodtbl[103X, or the ordinary character table of [22XH[122X such that the
  class fusion from the ordinary table of [3Xmodtbl[103X into this table is stored. In
  all  these  cases,  [2XIBrOfExtensionBySingularAutomorphism[102X  returns the values
  lists of the irreducible [22Xp[122X-modular Brauer characters of [22XH[122X.[133X
  
  [33X[0;0YNote  that  the  table  head  of the [22Xp[122X-modular Brauer table of [22XH[122X, in general
  without  the  [2XIrr[102X  ([14XReference:  Irr[114X)  attribute, can be obtained by applying
  [2XCharacterTableRegular[102X  ([14XReference:  CharacterTableRegular[114X)  to  the ordinary
  character  table  of [22XH[122X, but [2XIBrOfExtensionBySingularAutomorphism[102X can be used
  also  if  the  ordinary  character  table  of  [22XH[122X  is not known, and just the
  [22Xp[122X-modular  character  table of [22XG[122X and the action of [22XH[122X on the classes of [22XG[122X are
  given.[133X
  
  
  [1X5.7 [33X[0;0YCharacter Tables of Coprime Central Extensions[133X[101X
  
  [1X5.7-1 CharacterTableOfCommonCentralExtension[101X
  
  [33X[1;0Y[29X[2XCharacterTableOfCommonCentralExtension[102X( [3XtblG[103X, [3XtblmG[103X, [3XtblnG[103X, [3Xid[103X ) [32X function[133X
  
  [33X[0;0YLet  [3XtblG[103X  be  the ordinary character table of a group [22XG[122X, say, and let [3XtblmG[103X
  and [3XtblnG[103X be the ordinary character tables of central extensions [22Xm.G[122X and [22Xn.G[122X
  of  [22XG[122X by cyclic groups of prime orders [22Xm[122X and [22Xn[122X, respectively, with [22Xm ≠ n[122X. We
  assume  that  the  factor fusions from [3XtblmG[103X and [3XtblnG[103X to [3XtblG[103X are stored on
  the tables. [2XCharacterTableOfCommonCentralExtension[102X returns a record with the
  following components.[133X
  
  [8X[10XtblmnG[110X[8X[108X
        [33X[0;6Ythe  character table [22Xt[122X, say, of the corresponding central extension of
        [22XG[122X by a cyclic group of order [22Xm n[122X that factors through [22Xm.G[122X and [22Xn.G[122X; the
        [2XIdentifier[102X  ([14XReference: Identifier for character tables[114X) value of this
        table is [3Xid[103X,[133X
  
  [8X[10XIsComplete[110X[8X[108X
        [33X[0;6Y[9Xtrue[109X  if  the  [2XIrr[102X  ([14XReference:  Irr[114X)  value is stored in [22Xt[122X, and [9Xfalse[109X
        otherwise,[133X
  
  [8X[10Xirreducibles[110X[8X[108X
        [33X[0;6Ythe list of irreducibles of [22Xt[122X that are known; it contains the inflated
        characters  of  the factor groups [22Xm.G[122X and [22Xn.G[122X, plus those irreducibles
        that were found in tensor products of characters of these groups.[133X
  
  [33X[0;0YNote  that  the  conjugacy  classes  and  the  power  maps of [22Xt[122X are uniquely
  determined  by the input data. Concerning the irreducible characters, we try
  to  extract  them from the tensor products of characters of the given factor
  groups  by  reducing  with known irreducibles and applying the LLL algorithm
  (see [2XReducedClassFunctions[102X    ([14XReference:   ReducedClassFunctions[114X)   and [2XLLL[102X
  ([14XReference: LLL[114X)).[133X
  
  
  [1X5.8 [33X[0;0YConstruction Functions used in the Character Table Library[133X[101X
  
  [33X[0;0YThe  following  functions  are  used in the [5XGAP[105X Character Table Library, for
  encoding  table  constructions  via  the  mechanism  that  is  based  on the
  attribute [2XConstructionInfoCharacterTable[102X ([14X3.7-4[114X). All construction functions
  take  as  their  first  argument  a  record  that  describes the table to be
  constructed,  and  the  function adds only those components that are not yet
  contained in this record.[133X
  
  [1X5.8-1 ConstructMGA[101X
  
  [33X[1;0Y[29X[2XConstructMGA[102X( [3Xtbl[103X, [3Xsubname[103X, [3Xfactname[103X, [3Xplan[103X, [3Xperm[103X ) [32X function[133X
  
  [33X[0;0Y[2XConstructMGA[102X constructs the irreducible characters of the ordinary character
  table [3Xtbl[103X of a group [22Xm.G.a[122X where the automorphism [22Xa[122X (a group of prime order)
  of  [22Xm.G[122X  acts  nontrivially on the central subgroup [22Xm[122X of [22Xm.G[122X. [3Xsubname[103X is the
  name  of  the  subgroup  [22Xm.G[122X  which  is  a  (not necessarily cyclic) central
  extension  of  the (not necessarily simple) group [22XG[122X, [3Xfactname[103X is the name of
  the  factor  group [22XG.a[122X. Then the faithful characters of [3Xtbl[103X are induced from
  [22Xm.G[122X.[133X
  
  [33X[0;0Y[3Xplan[103X  is  a list, each entry being a list containing positions of characters
  of [22Xm.G[122X that form an orbit under the action of [22Xa[122X (the induction of characters
  is encoded this way).[133X
  
  [33X[0;0Y[3Xperm[103X  is the permutation that must be applied to the list of characters that
  is  obtained on appending the faithful characters to the inflated characters
  of the factor group. A nonidentity permutation occurs for example for groups
  of  structure  [22X12.G.2[122X  that are encoded via the subgroup [22X12.G[122X and the factor
  group  [22X6.G.2[122X,  where the faithful characters of [22X4.G.2[122X shall precede those of
  [22X6.G.2[122X, as in the [5XAtlas[105X.[133X
  
  [33X[0;0YExamples  where [2XConstructMGA[102X is used to encode library tables are the tables
  of [22X3.F_{3+}.2[122X (subgroup [22X3.F_{3+}[122X, factor group [22XF_{3+}.2[122X) and [22X12_1.U_4(3).2_2[122X
  (subgroup [22X12_1.U_4(3)[122X, factor group [22X6_1.U_4(3).2_2[122X).[133X
  
  [1X5.8-2 ConstructMGAInfo[101X
  
  [33X[1;0Y[29X[2XConstructMGAInfo[102X( [3XtblmGa[103X, [3XtblmG[103X, [3XtblGa[103X ) [32X function[133X
  
  [33X[0;0YLet  [3XtblmGa[103X  be  the  ordinary character table of a group of structure [22Xm.G.a[122X
  where  the  factor  group  of  prime order [22Xa[122X acts nontrivially on the normal
  subgroup  of order [22Xm[122X that is central in [22Xm.G[122X, [3XtblmG[103X be the character table of
  [22Xm.G[122X, and [3XtblGa[103X be the character table of the factor group [22XG.a[122X.[133X
  
  [33X[0;0Y[2XConstructMGAInfo[102X  returns  the  list  that  is  to  be stored in the library
  version  of  [3XtblmGa[103X:  the  first  entry  is  the  string [10X"ConstructMGA"[110X, the
  remaining  four  entries  are  the  last  four  arguments  for  the  call to
  [2XConstructMGA[102X ([14X5.8-1[114X).[133X
  
  [1X5.8-3 ConstructGS3[101X
  
  [33X[1;0Y[29X[2XConstructGS3[102X( [3Xtbls3[103X, [3Xtbl2[103X, [3Xtbl3[103X, [3Xind2[103X, [3Xind3[103X, [3Xext[103X, [3Xperm[103X ) [32X function[133X
  [33X[1;0Y[29X[2XConstructGS3Info[102X( [3Xtbl2[103X, [3Xtbl3[103X, [3Xtbls3[103X ) [32X function[133X
  
  [33X[0;0Y[2XConstructGS3[102X  constructs  the  irreducibles  of  an ordinary character table
  [3Xtbls3[103X  of  type  [22XG.S_3[122X  from  the  tables  with  names  [3Xtbl2[103X and [3Xtbl3[103X, which
  correspond  to  the  groups  [22XG.2[122X  and  [22XG.3[122X,  respectively. [3Xind2[103X is a list of
  numbers  referring  to  irreducibles  of [3Xtbl2[103X. [3Xind3[103X is a list of pairs, each
  referring to irreducibles of [3Xtbl3[103X. [3Xext[103X is a list of pairs, each referring to
  one  irreducible  character  of  [3Xtbl2[103X and one of [3Xtbl3[103X. [3Xperm[103X is a permutation
  that must be applied to the irreducibles after the construction.[133X
  
  [33X[0;0Y[2XConstructGS3Info[102X returns a record with the components [10Xind2[110X, [10Xind3[110X, [10Xext[110X, [10Xperm[110X,
  and [10Xlist[110X, as are needed for [2XConstructGS3[102X.[133X
  
  [1X5.8-4 ConstructV4G[101X
  
  [33X[1;0Y[29X[2XConstructV4G[102X( [3Xtbl[103X, [3Xfacttbl[103X, [3Xaut[103X ) [32X function[133X
  
  [33X[0;0YLet  [3Xtbl[103X  be  the  character  table  of a group of type [22X2^2.G[122X where an outer
  automorphism  of  order [22X3[122X permutes the three involutions in the central [22X2^2[122X.
  Let  [3Xaut[103X  be the permutation of classes of [3Xtbl[103X induced by that automorphism,
  and [3Xfacttbl[103X be the name of the character table of the factor group [22X2.G[122X. Then
  [2XConstructV4G[102X   constructs  the  irreducible  characters  of  [3Xtbl[103X  from  that
  information.[133X
  
  [1X5.8-5 ConstructProj[101X
  
  [33X[1;0Y[29X[2XConstructProj[102X( [3Xtbl[103X, [3Xirrinfo[103X ) [32X function[133X
  [33X[1;0Y[29X[2XConstructProjInfo[102X( [3Xtbl[103X, [3Xkernel[103X ) [32X function[133X
  
  [33X[0;0Y[2XConstructProj[102X  constructs  the irreducible characters of the record encoding
  the  ordinary  character  table  [3Xtbl[103X from projective characters of tables of
  factor  groups, which are stored in the [2XProjectivesInfo[102X ([14X3.7-2[114X) value of the
  smallest  factor;  the  information  about  the  name of this factor and the
  projectives to take is stored in [3Xirrinfo[103X.[133X
  
  [33X[0;0Y[2XConstructProjInfo[102X takes an ordinary character table [3Xtbl[103X and a list [3Xkernel[103X of
  class  positions  of  a  cyclic  kernel  of order dividing [22X12[122X, and returns a
  record with the components[133X
  
  [8X[10Xtbl[110X[8X[108X
        [33X[0;6Ya  character table that is permutation isomorphic with [3Xtbl[103X, and sorted
        such  that classes that differ only by multiplication with elements in
        the classes of [3Xkernel[103X are consecutive,[133X
  
  [8X[10Xprojectives[110X[8X[108X
        [33X[0;6Ya  record being the entry for the [10Xprojectives[110X list of the table of the
        factor  of  [3Xtbl[103X by [3Xkernel[103X, describing this part of the irreducibles of
        [3Xtbl[103X, and[133X
  
  [8X[10Xinfo[110X[8X[108X
        [33X[0;6Ythe  value of [3Xirrinfo[103X that is needed for constructing the irreducibles
        of  the  [10Xtbl[110X  component  of  the  result  ([13Xnot[113X the irreducibles of the
        argument [3Xtbl[103X!) via [2XConstructProj[102X.[133X
  
  [1X5.8-6 ConstructDirectProduct[101X
  
  [33X[1;0Y[29X[2XConstructDirectProduct[102X( [3Xtbl[103X, [3Xfactors[103X[, [3Xpermclasses[103X, [3Xpermchars[103X] ) [32X function[133X
  
  [33X[0;0YThe  direct  product  of  the library character tables described by the list
  [3Xfactors[103X  of  table  names  is  constructed using [2XCharacterTableDirectProduct[102X
  ([14XReference:  CharacterTableDirectProduct[114X),  and  all its components that are
  not yet stored on [3Xtbl[103X are added to [3Xtbl[103X.[133X
  
  [33X[0;0YThe  [2XComputedClassFusions[102X  ([14XReference: ComputedClassFusions[114X) value of [3Xtbl[103X is
  enlarged by the factor fusions from the direct product to the factors.[133X
  
  [33X[0;0YIf  the optional arguments [3Xpermclasses[103X, [3Xpermchars[103X are given then the classes
  and characters of the result are sorted accordingly.[133X
  
  [33X[0;0Y[3Xfactors[103X must have length at least two; use [2XConstructPermuted[102X ([14X5.8-11[114X) in the
  case of only one factor.[133X
  
  [1X5.8-7 ConstructCentralProduct[101X
  
  [33X[1;0Y[29X[2XConstructCentralProduct[102X( [3Xtbl[103X, [3Xfactors[103X, [3XDclasses[103X[, [3Xpermclasses[103X, [3Xpermchars[103X] ) [32X function[133X
  
  [33X[0;0YThe library table [3Xtbl[103X is completed with help of the table obtained by taking
  the  direct  product  of the tables with names in the list [3Xfactors[103X, and then
  factoring  out  the  normal  subgroup  that is given by the list [3XDclasses[103X of
  class positions.[133X
  
  [33X[0;0YIf  the optional arguments [3Xpermclasses[103X, [3Xpermchars[103X are given then the classes
  and characters of the result are sorted accordingly.[133X
  
  [1X5.8-8 ConstructSubdirect[101X
  
  [33X[1;0Y[29X[2XConstructSubdirect[102X( [3Xtbl[103X, [3Xfactors[103X, [3Xchoice[103X ) [32X function[133X
  
  [33X[0;0YThe library table [3Xtbl[103X is completed with help of the table obtained by taking
  the  direct  product  of the tables with names in the list [3Xfactors[103X, and then
  taking the table consisting of the classes in the list [3Xchoice[103X.[133X
  
  [33X[0;0YNote that in general, the restriction to the classes of a normal subgroup is
  not  sufficient  for  describing  the  irreducible characters of this normal
  subgroup.[133X
  
  [1X5.8-9 ConstructWreathSymmetric[101X
  
  [33X[1;0Y[29X[2XConstructWreathSymmetric[102X( [3Xtbl[103X, [3Xsubname[103X, [3Xn[103X[, [3Xpermclasses[103X, [3Xpermchars[103X] ) [32X function[133X
  
  [33X[0;0YThe  wreath  product  of  the  library character table with identifier value
  [3Xsubname[103X   with  the  symmetric  group  on  [3Xn[103X  points  is  constructed  using
  [2XCharacterTableWreathSymmetric[102X   ([14XReference:  CharacterTableWreathSymmetric[114X),
  and all its components that are not yet stored on [3Xtbl[103X are added to [3Xtbl[103X.[133X
  
  [33X[0;0YIf  the optional arguments [3Xpermclasses[103X, [3Xpermchars[103X are given then the classes
  and characters of the result are sorted accordingly.[133X
  
  [1X5.8-10 ConstructIsoclinic[101X
  
  [33X[1;0Y[29X[2XConstructIsoclinic[102X( [3Xtbl[103X, [3Xfactors[103X[, [3Xnsg[103X[, [3Xcentre[103X]][, [3Xpermclasses[103X, [3Xpermchars[103X] ) [32X function[133X
  
  [33X[0;0Yconstructs  first  the direct product of library tables as given by the list
  [3Xfactors[103X  of  admissible  character  table  names,  and  then  constructs the
  isoclinic table of the result.[133X
  
  [33X[0;0YIf   the   argument   [3Xnsg[103X   is   present   and  a  record  or  a  list  then
  [2XCharacterTableIsoclinic[102X  ([14XReference:  CharacterTableIsoclinic[114X)  gets called,
  and [3Xnsg[103X (as well as [3Xcentre[103X if present) is passed to this function.[133X
  
  [33X[0;0YIn  both  cases,  if the optional arguments [3Xpermclasses[103X, [3Xpermchars[103X are given
  then the classes and characters of the result are sorted accordingly.[133X
  
  [1X5.8-11 ConstructPermuted[101X
  
  [33X[1;0Y[29X[2XConstructPermuted[102X( [3Xtbl[103X, [3Xlibnam[103X[, [3Xpermclasses[103X, [3Xpermchars[103X] ) [32X function[133X
  
  [33X[0;0YThe  library  table  [3Xtbl[103X  is  computed  from the library table with the name
  [3Xlibnam[103X,  by  permuting  the  classes  and the characters by the permutations
  [3Xpermclasses[103X and [3Xpermchars[103X, respectively.[133X
  
  [33X[0;0YSo  [3Xtbl[103X  and  the  library  table  with  the  name  [3Xlibnam[103X  are  permutation
  equivalent.  With  the more general function [2XConstructAdjusted[102X ([14X5.8-12[114X), one
  can derive character tables that are not necessarily permutation equivalent,
  by additionally replacing some defining data.[133X
  
  [33X[0;0YThe  two  permutations  are  optional. If they are missing then the lists of
  irreducible  characters  and  the  power  maps  of  the two character tables
  coincide.  However, different class fusions may be stored on the two tables.
  This  is used for example in situations where a group has several classes of
  isomorphic  maximal  subgroups  whose class fusions are different; different
  character  tables  (with different identifiers) are stored for the different
  classes,  each  with  appropriate class fusions, and all these tables except
  the  one for the first class of subgroups can be derived from this table via
  [2XConstructPermuted[102X.[133X
  
  [1X5.8-12 ConstructAdjusted[101X
  
  [33X[1;0Y[29X[2XConstructAdjusted[102X( [3Xtbl[103X, [3Xlibnam[103X, [3Xpairs[103X[, [3Xpermclasses[103X, [3Xpermchars[103X] ) [32X function[133X
  
  [33X[0;0YThe  defining  attribute  values  of  the library table [3Xtbl[103X are given by the
  attribute values described by the list [3Xpairs[103X and –for those attributes which
  do  not  appear  in [3Xpairs[103X– by the attribute values of the library table with
  the  name  [3Xlibnam[103X,  whose  classes  and characters have been permuted by the
  optional permutations [3Xpermclasses[103X and [3Xpermchars[103X, respectively.[133X
  
  [33X[0;0YThis  construction  can  be  used  to  derive a character table from another
  library  table  (the  one  with  the  name  [3Xlibnam[103X)  that is [13Xnot[113X permutation
  equivalent  to  this  table.  For  example, it may happen that the character
  tables  of  a  split and a nonsplit extension differ only by some power maps
  and  element  orders.  In  this  case,  one can encode one of the tables via
  [2XConstructAdjusted[102X, by prescribing just the power maps in the list [3Xpairs[103X.[133X
  
  [33X[0;0YIf  no  replacement  of  components  is  needed  then  one should better use
  [2XConstructPermuted[102X  ([14X5.8-11[114X),  because  the  system can then exploit the fact
  that the two tables are permutation equivalent.[133X
  
  [1X5.8-13 ConstructFactor[101X
  
  [33X[1;0Y[29X[2XConstructFactor[102X( [3Xtbl[103X, [3Xlibnam[103X, [3Xkernel[103X ) [32X function[133X
  
  [33X[0;0YThe  library table [3Xtbl[103X is completed with help of the library table with name
  [3Xlibnam[103X, by factoring out the classes in the list [3Xkernel[103X.[133X
  
