terms |
unimodular |
As a noun terms
is .
As an adjective unimodular is
(mathematics|of a lattice or matrix) having a determinant of 1 or -1.
unimodular |
unimodularity |
As an adjective unimodular
is (mathematics|of a lattice or matrix) having a determinant of 1 or -1.
As a noun unimodularity is
the condition of being unimodular.
determinant |
unimodular |
As adjectives the difference between determinant and unimodular
is that
determinant is determinant while
unimodular is (mathematics|of a lattice or matrix) having a determinant of 1 or -1.
As a verb determinant
is .
As a noun determinant
is (
label) determiner.
matrix |
unimodular |
As a noun matrix
is matrix.
As an adjective unimodular is
(mathematics|of a lattice or matrix) having a determinant of 1 or -1.
lattice |
unimodular |
As a noun lattice
is a flat panel constructed with widely-spaced crossed thin strips of wood or other material, commonly used as a garden trellis.
As a verb lattice
is to make a lattice of.
As an adjective unimodular is
(mathematics|of a lattice or matrix) having a determinant of 1 or -1.
unimodular |
nonunimodular |
Nonunimodular is a antonym of unimodular.
As adjectives the difference between unimodular and nonunimodular
is that
unimodular is having a determinant of 1 or -1 while
nonunimodular is not unimodular.
