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K3Carpets : Table of Contents
K3Carpets
-- The unique Gorenstein double structure on a surface scroll
allGradings
-- add Grading to a chainComplex
analyzeStrand
-- analyze the (a+1)-st constant strand of F over ZZ
canonicalCarpet
-- Carpet of given genus and Clifford index
canonicalHomotopies
-- Homotopies on the resolution of a K3 carpet
carpet
-- Ideal of the unique Gorenstein double structure on a 2-dimensional scroll
carpetBettiTable
-- compute the Betti tables of a carpet of given genus and Clifford index over a prime field of characteristic p
carpetBettiTables
-- compute the Betti tables of a carpet of given genus and Clifford index over all prime fields
carpetDet
-- compute the determinant of the crucial constant strand of a carpet X(a,b)
computeBound
-- compute the bound for the good types in case of k resonance
correspondenceScroll
-- Union of planes joining points of rational normal curves according to a given correspondence
coxMatrices
-- compute the Cox matrices
degenerateK3
-- Ideal of a degenerate K3 surface X_e(a,b)
degenerateK3BettiTables
-- compute the Betti tables of a degenerate K3 over all prime fields
FineGrading
-- Option for carpet, canonicalCarpet
gorensteinDouble
-- attempts to produce a Gorenstein double structure J subset I
hankelMatrix
-- matrix with constant anti-diagonal entries
homotopyRanks
-- compute the ranks of the quadratic homotopies on a carpet
irrelevantIdeal
-- returns the irrelevant ideal of a multi-graded ring
productOfProjectiveSpaces
-- Constructs the multi-graded ring of a product of copies of P^1 (pp is a synonym)
relativeEquations
-- compute the relative quadrics
relativeResolution
-- compute the relative resolution
relativeResolutionTwists
-- compute the twists in the relative resolution
resonanceDet
-- compute the resonance determinant of the crucial constant strand of a degenerate K3 X_e(a,a)
resonanceScroll
-- compute the splitting type of the resonance scroll
schemeInProduct
-- multi-graded Ideal of the image of a map to a product of projective spaces
schreyerName
-- get the names of generators in the (nonminimal) Schreyer resolution according to Schreyer's convention
Scrolls
-- Option for carpet, canonicalCarpet
smallDiagonal
-- Ideal of the small diagonal in (P^1)^n