  
  
  [1XIndex[101X
  
  [2X\^[102X 6.2-2 
  Abelian Crossed Product 9.8 
  [10XActionForCrossedProduct[110X 5.1-1 
  [2XAntiSymMatUpMat[102X 7.3-1 
  [2XAverageSum[102X 6.2-3 
  Basis of units (for crossed product) 9.6 
  (Brauer) equivalence 9.5 
  central simple algebra 9.5 
  [2XCentralizer[102X 6.2-1 
  [2XCharacterDescent[102X 7.3-2 
  Classical Crossed Product 9.9 
  [2XCodeByLeftIdeal[102X 8.1-2 
  [2XCodeWordByGroupRingElement[102X 8.1-1 
  CoefficientsAndMagmaElements 5.2-1 
  Complete set of orthogonal primitive idempotents 9.22 
  [2XConvertCyclicAlgToCyclicCyclotomicAlg[102X 7.7-2 
  [2XConvertCyclicCyclotomicAlgToCyclicAlg[102X 7.7-3 
  [2XConvertQuadraticAlgToQuaternionAlg[102X 7.7-2 
  [2XConvertQuaternionAlgToQuadraticAlg[102X 7.7-3 
  Crossed Product 9.6 
  [2XCrossedProduct[102X 5.1-1 
  Cyclic Algebra 9.10 
  Cyclic Crossed Product 9.7 
  Cyclotomic algebra 9.11 
  cyclotomic class 9.19 
  [2XCyclotomicAlgebraAsSCAlgebra[102X 7.1-4 
  [2XCyclotomicAlgebraWithDivAlgPart[102X 7.1-2 
  [2XCyclotomicClasses[102X 6.3-1 
  [2XCyclotomicExtensionGenerator[102X 7.3-1 
  [2XDecomposeCyclotomicAlgebra[102X 7.7-1 
  [2XDefectGroupOfConjugacyClassAtP[102X 7.5-5 
  [2XDefectGroupsOfPBlock[102X 7.5-5 
  [2XDefectOfCharacterAtP[102X 7.5-5 
  [2XDefiningCharacterOfCyclotomicAlgebra[102X 7.5-3 
  [2XDefiningGroupAndCharacterOfCyclotAlg[102X 7.5-3 
  [2XDefiningGroupOfCyclotomicAlgebra[102X 7.5-3 
  [22Xe(G,K,H)[122X 9.13 
  [22Xe_C(G,K,H)[122X 9.13 
  [2XElementOfCrossedProduct[102X 5.2-1 
  [10XEmbedding[110X 5.2-1 
  equivalence (Brauer) 9.5 
  equivalent extremely strong Shoda pairs 9.16 
  equivalent strong Shoda pairs 9.15 
  extremely strong Shoda pair 9.16 
  [2XExtremelyStrongShodaPairs[102X 3.1-1 
  field of character values 9.4 
  [2XFinFieldExt[102X 7.5-6 
  [2XGaloisRepsOfCharacters[102X 7.3-3 
  generating cyclotomic class 9.19 
  [2XGlobalCharacterDescent[102X 7.3-2 
  [2XGlobalSchurIndexFromLocalIndices[102X 7.6-1 
  [2XGlobalSplittingOfCyclotomicAlgebra[102X 7.3-1 
  group algebra 9.1 
  group code 9.23 
  group ring 9.1 
  [2XInfoWedderga[102X 6.4-1 
  [2XIsCompleteSetOfOrthogonalIdempotents[102X 4.2-1 
  [10XIsCrossedProduct[110X 5.1-1 
  [10XIsCrossedProductObjDefaultRep[110X 5.2-1 
  [2XIsCyclotomicClass[102X 6.3-2 
  [2XIsDyadicSchurGroup[102X 7.5-7 
  [10XIsElementOfCrossedProduct[110X 5.2-1 
  [2XIsExtremelyStrongShodaPair[102X 3.3-1 
  [2XIsNormallyMonomial[102X 3.3-5 
  [2XIsRationalQuaternionAlgebraADivisionRing[102X 7.6-2 
  [2XIsSemisimpleANFGroupAlgebra[102X 6.1-3 
  [2XIsSemisimpleFiniteGroupAlgebra[102X 6.1-4 
  [2XIsSemisimpleRationalGroupAlgebra[102X 6.1-2 
  [2XIsSemisimpleZeroCharacteristicGroupAlgebra[102X 6.1-1 
  [2XIsShodaPair[102X 3.3-3 
  [2XIsStronglyMonomial[102X 3.3-4 
  [2XIsStrongShodaPair[102X 3.3-2 
  [2XIsTwistingTrivial[102X 6.1-5 
  [2XKillingCocycle[102X 7.3-1 
  [10XLeftActingDomain[110X 5.1-1 
  linear code 9.23 
  [2XLocalIndexAtInfty[102X 7.4-2 
  [2XLocalIndexAtInftyByCharacter[102X 7.5-4 
  [2XLocalIndexAtOddP[102X 7.4-2 
  [2XLocalIndexAtOddPByCharacter[102X 7.5-7 
  [2XLocalIndexAtPByBrauerCharacter[102X 7.5-6 
  [2XLocalIndexAtTwo[102X 7.4-2 
  [2XLocalIndexAtTwoByCharacter[102X 7.5-7 
  [2XLocalIndicesOfCyclicCyclotomicAlgebra[102X 7.4-1 
  [2XLocalIndicesOfCyclotomicAlgebra[102X 7.5-1 
  [2XLocalIndicesOfRationalQuaternionAlgebra[102X 7.6-1 
  [2XLocalIndicesOfRationalSymbolAlgebra[102X 7.6-1 
  [2XLocalIndicesOfTensorProductOfQuadraticAlgs[102X 7.6-1 
  normally monomial character 9.18 
  normally monomial group 9.18 
  [2XOnPoints[102X 6.2-2 
  [2XPDashPartOfN[102X 7.2-1 
  [2XPPartOfN[102X 7.2-1 
  primitive central idempotent 9.4 
  primitive central idempotent realized by a Shoda pair 9.14 
  primitive central idempotent realized by a strong Shoda pair and a cyclotomic class 9.19 
  [2XPrimitiveCentralIdempotentsByCharacterTable[102X 4.1-1 
  [2XPrimitiveCentralIdempotentsByESSP[102X 4.3-1 
  [2XPrimitiveCentralIdempotentsBySP[102X 4.3-3 
  [2XPrimitiveCentralIdempotentsByStrongSP[102X 4.3-2 
  [2XPrimitiveIdempotentsNilpotent[102X 4.4-1 
  [2XPrimitiveIdempotentsTrivialTwisting[102X 4.4-2 
  [2XPSplitSubextension[102X 7.2-2 
  Quaternion algebra 5.1-1 
  [2XRamificationIndexAtP[102X 7.2-3 
  [2XReducingCyclotomicAlgebra[102X 7.3-1 
  [2XResidueDegreeAtP[102X 7.2-3 
  [2XRootOfDimensionOfCyclotomicAlgebra[102X 7.5-2 
  [2XSchurIndex[102X 7.1-3 
  [2XSchurIndexByCharacter[102X 7.1-3 
  semisimple ring 9.2 
  Shoda pair 9.14 
  [2XSimpleAlgebraByCharacter[102X 2.2-1 
  [2XSimpleAlgebraByCharacterInfo[102X 2.2-2 
  [2XSimpleAlgebraByStrongSP[102X, for rational group algebra 2.2-3 
      for semisimple finite group algebra 2.2-3 
  [2XSimpleAlgebraByStrongSPInfo[102X, for rational group algebra 2.2-4 
      for semisimple finite group algebra 2.2-4 
  [2XSimpleAlgebraByStrongSPInfoNC[102X, for rational group algebra 2.2-4 
      for semisimple finite group algebra 2.2-4 
  [2XSimpleAlgebraByStrongSPNC[102X, for rational group algebra 2.2-3 
      for semisimple finite group algebra 2.2-3 
  [2XSimpleComponentByCharacterAsSCAlgebra[102X 7.1-4 
  [2XSimpleComponentByCharacterDescent[102X 7.3-2 
  [2XSimpleComponentOfGroupRingByCharacter[102X 7.5-3 
  strongly monomial character 9.17 
  strongly monomial group 9.17 
  [2XSplittingDegreeAtP[102X 7.2-3 
  strong Shoda pair 9.15 
  [2XStrongShodaPairs[102X 3.2-1 
  [10XTwistingForCrossedProduct[110X 5.1-1 
  [10XUnderlyingMagma[110X 5.1-1 
  Wedderburn components 9.3 
  Wedderburn decomposition 9.3 
  [2XWedderburnDecomposition[102X 2.1-1 
  [2XWedderburnDecompositionAsSCAlgebras[102X 7.1-4 
  [2XWedderburnDecompositionByCharacterDescent[102X 7.3-4 
  [2XWedderburnDecompositionInfo[102X 2.1-2 
  [2XWedderburnDecompositionWithDivAlgParts[102X 7.1-1 
  [5XWedderga[105X package .-1 
  [10XZeroCoefficient[110X 5.2-1 
  [22Xε(K,H)[122X 9.13 
  
  
  -------------------------------------------------------
