top
|
toc
|
Macaulay2 website
MixedMultiplicity : Index
A
B
C
D
E
F
G
H
I
J
K
L
M
N
O
P
Q
R
S
T
U
V
W
X
Y
Z
homIdealPolytope
-- Compute the homogeneous ideal corresponding to the vertices of a lattice polytope in $\mathbb{R}^n$.
homIdealPolytope(...,CoefficientRing=>...)
-- choose the coefficient ring of the (output) ideal
homIdealPolytope(...,VariableBaseName=>...)
-- choose a base name for variables in the created ring
homIdealPolytope(List)
-- Compute the homogeneous ideal corresponding to the vertices of a lattice polytope in $\mathbb{R}^n$.
MixedMultiplicity
-- Calculate mixed multiplicities, mixed volume and sectional Milnor numbers
mixedMultiplicity
-- Compute a given mixed multiplicity of ideals
mixedMultiplicity(Sequence,Sequence)
-- Compute a given mixed multiplicity of ideals
mMixedVolume
-- Compute the mixed volume of a collection of lattice polytopes
mMixedVolume(List)
-- Compute the mixed volume of a collection of lattice polytopes
multiReesIdeal
-- Compute the defining ideal of multi-Rees algebra of ideals
multiReesIdeal(...,VariableBaseName=>...)
-- choose a base name for variables in the created ring
multiReesIdeal(Ideal)
-- Compute the defining ideal of multi-Rees algebra of ideals
multiReesIdeal(Ideal,RingElement)
-- Compute the defining ideal of multi-Rees algebra of ideals
multiReesIdeal(List)
-- Compute the defining ideal of multi-Rees algebra of ideals
multiReesIdeal(List,List)
-- Compute the defining ideal of multi-Rees algebra of ideals
secMilnorNumbers
-- Compute the sectional Milnor numbers of a hypersurface with an isolated singularity
secMilnorNumbers(RingElement)
-- Compute the sectional Milnor numbers of a hypersurface with an isolated singularity