i3 : (intCl,normRees)=intclMonIdeal(allComputations=>true,I)
3 2 2 3
o3 = (ideal (y , x*y , x y, x ),
------------------------------------------------------------------------
MonomialSubalgebra{cache => CacheTable{...1...} })
3 2 2 3
generators => {y, y a, x, x*y a, x y*a, x a}
ZZ
ring => --[x..y, a]
37
o3 : Sequence
|
i4 : normRees.cache#"cone"
o4 = RationalCone{cgr => | 0 | }
| 4 |
equ => | 0 |
| 3 |
gen => | 0 1 0 |
| 0 3 1 |
| 1 0 0 |
| 1 2 1 |
| 2 1 1 |
| 3 0 1 |
inv => HashTable{ => (1, 1, 1) }
class group => 1 : (1)
degree 1 elements => 6
dim max subspace => 0
embedding dim => 3
external index => 1
graded => true
grading denom => 1
grading => (1, 1, -2)
hilbert basis elements => 6
hilbert quasipolynomial denom => 1
hilbert series denom => (1, 1, 1)
hilbert series num => (1, 3)
ideal multiplicity => 9
inhomogeneous => false
integrally closed => true
internal index => 1
multiplicity denom => 1
multiplicity => 4
number extreme rays => 4
number support hyperplanes => 4
primary => true
rank => 3
size triangulation => 4
sum dets => 4
sup => | 0 0 1 |
| 0 1 0 |
| 1 0 0 |
| 1 1 -3 |
o4 : RationalCone
|