  
  
  [1m[4m[31mIndex[0m
  
  [1m[34mAddSpecialGapOfNumericalSemigroup[0m  5.1-2
  [1m[34mAmbientNumericalSemigroupOfIdeal[0m  7.1-5
  [1m[34mAnIrreducibleNumericalSemigroupWithFrobeniusNumber[0m  6.1-4
  [1m[34mAperyListOfNumericalSemigroupAsGraph[0m  3.1-7
  [1m[34mAperyListOfNumericalSemigroupWRTElement[0m  3.1-5
  [1m[34mArfNumericalSemigroupClosure[0m  8.2-2
  [1m[34mBelongsToIdealOfNumericalSemigroup[0m  7.1-7
  [1m[34mBelongsToNumericalSemigroup[0m  2.2-6
  [1m[34mBezoutSequence[0m  A.1-1
  [1m[34mBlowUpIdealOfNumericalSemigroup[0m  7.1-14
  [1m[34mBlowUpOfNumericalSemigroup[0m  7.1-17
  [1m[34mCanonicalIdealOfNumericalSemigroup[0m  7.1-20
  [1m[34mCatenaryDegreeNumericalSemigroup[0m  9.1-7
  [1m[34mCeilingOfRational[0m  A.1-3
  [1m[34mDecomposeIntoIrreducibles[0m  6.1-6
  [1m[34mDeltaSetOfFactorizationsElementWRTNumericalSemigroup[0m  9.1-5
  [1m[34mDifferenceOfIdealsOfNumericalSemigroup[0m  7.1-11
  [1m[34mDrawAperyListOfNumericalSemigroup[0m  3.1-6
  [1m[34mElasticityOfFactorizationsElementWRTNumericalSemigroup[0m  9.1-3
  [1m[34mElasticityOfNumericalSemigroup[0m  9.1-4
  [1m[34mFactorizationsElementWRTNumericalSemigroup[0m  9.1-1
  [1m[34mFirstElementsOfNumericalSemigroup[0m  3.1-4
  [1m[34mFortenTruncatedNCForNumericalSemigroups[0m  4.1-1
  [1m[34mFrobeniusNumber[0m  3.2-2
  [1m[34mFrobeniusNumberOfNumericalSemigroup[0m  3.2-1
  [1m[34mFundamentalGapsOfNumericalSemigroup[0m  3.3-2
  [1m[34mGapsOfNumericalSemigroup[0m  3.3-1
  [1m[34mGeneratorsOfIdealOfNumericalSemigroup[0m  7.1-4
  [1m[34mGeneratorsOfIdealOfNumericalSemigroupNC[0m  7.1-4
  [1m[34mGeneratorsOfNumericalSemigroup[0m  3.1-2
  [1m[34mGeneratorsOfNumericalSemigroupNC[0m  3.1-2
  [1m[34mGraphAssociatedToElementInNumericalSemigroup[0m  4.1-3
  [1m[34mHilbertFunctionOfIdealOfNumericalSemigroup[0m  7.1-13
  [1m[34mIdealOfNumericalSemigroup[0m  7.1-1
  [1m[34mIntersectionIdealsOfNumericalSemigroup[0m  7.1-21
  [1m[34mIntersectionOfNumericalSemigroups[0m  5.1-3
  [1m[34mIrreducibleNumericalSemigroupsWithFrobeniusNumber[0m  6.1-5
  [1m[34mIsAperyListOfNumericalSemigroup[0m  2.2-4
  [1m[34mIsArfNumericalSemigroup[0m  8.2-1
  [1m[34mIsBezoutSequence[0m  A.1-2
  [1m[34mIsGradedAssociatedRingNumericalSemigroupCM[0m  7.1-19
  [1m[34mIsIdealOfNumericalSemigroup[0m  7.1-2
  [1m[34mIsIrreducibleNumericalSemigroup[0m  6.1-1
  [1m[34mIsMEDNumericalSemigroup[0m  8.1-1
  [1m[34mIsModularNumericalSemigroup[0m  2.2-1
  [1m[34mIsNumericalSemigroup[0m  2.2-1
  [1m[34mIsNumericalSemigroupByAperyList[0m  2.2-1
  [1m[34mIsNumericalSemigroupByFundamentalGaps[0m  2.2-1
  [1m[34mIsNumericalSemigroupByGaps[0m  2.2-1
  [1m[34mIsNumericalSemigroupByGenerators[0m  2.2-1
  [1m[34mIsNumericalSemigroupByInterval[0m  2.2-1
  [1m[34mIsNumericalSemigroupByMinimalGenerators[0m  2.2-1
  [1m[34mIsNumericalSemigroupByOpenInterval[0m  2.2-1
  [1m[34mIsNumericalSemigroupBySmallElements[0m  2.2-1
  [1m[34mIsNumericalSemigroupBySubAdditiveFunction[0m  2.2-1
  [1m[34mIsProportionallyModularNumericalSemigroup[0m  2.2-1
  [1m[34mIsPseudoSymmetricNumericalSemigroup[0m  6.1-3
  [1m[34mIsSubsemigroupOfNumericalSemigroup[0m  2.2-5
  [1m[34mIsSymmetricNumericalSemigroup[0m  6.1-2
  [1m[34mLengthsOfFactorizationsElementWRTNumericalSemigroup[0m  9.1-2
  [1m[34mMaximalIdealOfNumericalSemigroup[0m  7.1-16
  [1m[34mMaximumDegreeOfElementWRTNumericalSemigroup[0m  9.1-6
  [1m[34mMEDNumericalSemigroupClosure[0m  8.1-2
  [1m[34mMicroInvariantsOfNumericalSemigroup[0m  7.1-18
  [1m[34mMinimalArfGeneratingSystemOfArfNumericalSemigroup[0m  8.2-3
  [1m[34mMinimalGeneratingSystemOfIdealOfNumericalSemigroup[0m  7.1-3
  [1m[34mMinimalGeneratingSystemOfNumericalSemigroup[0m  3.1-2
  [1m[34mMinimalMEDGeneratingSystemOfMEDNumericalSemigroup[0m  8.1-3
  [1m[34mMinimalPresentationOfNumericalSemigroup[0m  4.1-2
  [1m[34mModularNumericalSemigroup[0m  2.1-2
  [1m[34mMultipleOfIdealOfNumericalSemigroup[0m  7.1-9
  [1m[34mMultiplicityOfNumericalSemigroup[0m  3.1-1
  [1m[34mNumericalSemigroup[0m  2.1-1
  [1m[34mNumericalSemigroupByAperyList[0m  2.1-4
  [1m[34mNumericalSemigroupByFundamentalGaps[0m  2.1-4
  [1m[34mNumericalSemigroupByGaps[0m  2.1-4
  [1m[34mNumericalSemigroupByGenerators[0m  2.1-4
  [1m[34mNumericalSemigroupByInterval[0m  2.1-4
  [1m[34mNumericalSemigroupByMinimalGenerators[0m  2.1-4
  [1m[34mNumericalSemigroupByMinimalGeneratorsNC[0m  2.1-4
  [1m[34mNumericalSemigroupByOpenInterval[0m  2.1-4
  [1m[34mNumericalSemigroupBySmallElements[0m  2.1-4
  [1m[34mNumericalSemigroupBySubAdditiveFunction[0m  2.1-4
  [1m[34mNumericalSemigroupsWithFrobeniusNumber[0m  5.2-2
  [1m[34mOverSemigroupsNumericalSemigroup[0m  5.2-1
  [1m[34mProportionallyModularNumericalSemigroup[0m  2.1-3
  [1m[34mPseudoFrobeniusOfNumericalSemigroup[0m  3.2-3
  [1m[34mQuotientOfNumericalSemigroup[0m  5.1-4
  [1m[34mRandomListForNS[0m  B.1-2
  [1m[34mRandomListRepresentingSubAdditiveFunction[0m  B.1-5
  [1m[34mRandomModularNumericalSemigroup[0m  B.1-3
  [1m[34mRandomNumericalSemigroup[0m  B.1-1
  [1m[34mRandomProportionallyModularNumericalSemigroup[0m  B.1-4
  [1m[34mReductionNumberIdealNumericalSemigroup[0m  7.1-15
  [1m[34mRemoveMinimalGeneratorFromNumericalSemigroup[0m  5.1-1
  [1m[34mRepresentsGapsOfNumericalSemigroup[0m  2.2-3
  [1m[34mRepresentsPeriodicSubAdditiveFunction[0m  A.2-1
  [1m[34mRepresentsSmallElementsOfNumericalSemigroup[0m  2.2-2
  [1m[34mSmallElementsOfIdealOfNumericalSemigroup[0m  7.1-6
  [1m[34mSmallElementsOfNumericalSemigroup[0m  3.1-3
  [1m[34mSpecialGapsOfNumericalSemigroup[0m  3.3-3
  [1m[34mSubtractIdealsOfNumericalSemigroup[0m  7.1-10
  [1m[34mSumIdealsOfNumericalSemigroup[0m  7.1-8
  [1m[34mTameDegreeNumericalSemigroup[0m  9.1-8
  [1m[34mTranslationOfIdealOfNumericalSemigroup[0m  7.1-12
  [1m[34mXNumericalSemigroup[0m  C.1-1
  
  
  -------------------------------------------------------
