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Packages » ToricVectorBundles :: ring(ToricVectorBundle)

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ring(ToricVectorBundle) -- the graded ring of the bundle

Synopsis

Function: ring
Usage:

R = ring E
Inputs:
- E, an instance of the type ToricVectorBundle
Outputs:
- R, a ring

Description

For a vector bundle in Kaneyama's description the graded ring is QQ with degree space the lattice of the underlying fan.

i1 : E = tangentBundle(projectiveSpaceFan 3,"Type" => "Kaneyama")

o1 = {dimension of the variety => 3 }
      number of affine charts => 4
      rank of the vector bundle => 3

o1 : ToricVectorBundleKaneyama

i2 : ring E

o2 = QQ[]

o2 : PolynomialRing

For a vector bundle in Klyachko's description the graded ring is QQ with degree space the lattice of the underlying fan.

i3 : E = toricVectorBundle(1,projectiveSpaceFan 2, toList(3:matrix{{1/2}}),toList(3:matrix{{-1}}))

o3 = {dimension of the variety => 2 }
      number of affine charts => 3
      number of rays => 3
      rank of the vector bundle => 1

o3 : ToricVectorBundleKlyachko

i4 : ring E

o4 = QQ[]

o4 : PolynomialRing

See also

HH^ZZ ToricVectorBundle -- the i-th cohomology group of a toric vector bundle
HH^ZZ(ToricVectorBundle,Matrix) -- the i-th cohomology of a toric vector bundle in a given degree
HH^ZZ(ToricVectorBundle,List) -- the i-th cohomology of a toric vector bundle for a given list of degrees

Ways to use this method:

ring(ToricVectorBundle) -- the graded ring of the bundle