QthPower : Index

grevlexWeight  transform a weight matrix into a monomial ordering matrix

grevlexWeight(Matrix)  transform a weight matrix into a monomial ordering matrix

minimization  change to a better Noether normalization suggested by the induced weights

minimization(List,List,Ring,Matrix)  change to a better Noether normalization suggested by the induced weights

qthConductor  computes a conductor element which also lives in the given Noether normalization, P

qthConductor(Ideal,ZZ)  computes a conductor element which also lives in the given Noether normalization, P

qthIntegralClosure  computes integral closures in positive characteristic

qthIntegralClosure(Matrix,Ring,List)  computes integral closures in positive characteristic

QthPower

rationalIntegralClosure  computes integral closures over the rationals

rationalIntegralClosure(Matrix,Ring,List)  computes integral closures over the rationals

testWeightMatrix  test compatibility of weight matrix with Groebner basis elements

testWeightMatrix(Matrix,Ring,List)  test compatibility of weight matrix with Groebner basis elements

weightGrevlex  transform a weight matrix into a monomial ordering matrix

weightGrevlex(Matrix)  transform a weight matrix into a monomial ordering matrix