Normal Polytope
In mathematics, specifically in combinatorial commutative algebra, a convex lattice polytope P is called normal if it has the following property: given any positive integer n, every lattice point of the dilation nP, obtained from P by scaling its vertices by the factor n and taking the convex hull of the resulting points, can be written as the sum of exactly n lattice points in P. This property plays an important role in the theory of toric varieties, where it corresponds to projective normality of the toric variety determined by P. Normal polytopes have popularity in algebraic combinatorics. These polytopes also represent the homogeneous case of the Hilbert bases of finite positive rational cones and the connection to to algebraic geometry is that they define protectively normal embeddings of toric varieties.
Read more about Normal Polytope: Definition, Examples, Properties, Relation To Normal Monoids, Open Problem, See Also
Famous quotes containing the word normal:
“Everyone in the full enjoyment of all the blessings of his life, in his normal condition, feels some individual responsibility for the poverty of others. When the sympathies are not blunted by any false philosophy, one feels reproached by one’s own abundance.”
—Elizabeth Cady Stanton (1815–1902)