QuickRank -- an option for controlling how rank is computed
Description
If set to true, then checking whether rank is at least a certain number will be computed via the package FastMinors.
See also
inverseOfMap -- inverse of a birational map between projective varieties
Functions with optional argument named QuickRank :
idealOfImageOfMap(...,QuickRank=>...) -- see idealOfImageOfMap -- finds defining equations for the image of a rational map between varieties or schemes
inverseOfMap(...,QuickRank=>...) -- see inverseOfMap -- inverse of a birational map between projective varieties
isBirationalMap(...,QuickRank=>...) -- see isBirationalMap -- whether a map between projective varieties is birational
isBirationalOntoImage(...,QuickRank=>...) -- see isBirationalOntoImage -- whether a map between projective varieties is birational onto its image
isEmbedding(...,QuickRank=>...) -- see isEmbedding -- whether a rational map of projective varieties is a closed embedding
jacobianDualMatrix(...,QuickRank=>...) -- see jacobianDualMatrix -- computes the Jacobian dual matrix
mapOntoImage(...,QuickRank=>...) -- see mapOntoImage -- the induced map from a variety to the closure of its image under a rational map
sourceInversionFactor(...,QuickRank=>...) -- see sourceInversionFactor -- computes the common factor among the components of the composition of the inverse map and the original map