Convex lattice polytope

A convex lattice polytope (also called Z-polyhedron or Z-polytope) is a geometric object playing an important role in discrete geometry and combinatorial commutative algebra. It is a polytope in a Euclidean space Rⁿ which is a convex hull of finitely many points in the integer lattice Zⁿ ⊂ Rⁿ. Such objects are prominently featured in the theory of toric varieties, where they correspond to polarized projective toric varieties.

Examples

An n-dimensional simplex Δ in Rⁿ is the convex hull of n+1 points that do not lie on a single affine hyperplane. The simplex is a convex lattice polytope if (and only if) the vertices have integral coordinates. The corresponding toric variety is the n-dimensional projective space Pⁿ.
The unit cube in Rⁿ, whose vertices are the 2ⁿ points all of whose coordinates are 0 or 1, is a convex lattice polytope. The corresponding toric variety is the Segre embedding of the n-fold product of the projective line P¹.
In the special case of two-dimensional convex lattice polytopes in R², they are also known as convex lattice polygons.
In algebraic geometry, an important instance of lattice polytopes called the Newton polytopes are the convex hulls of the set $A$ which consists of all the exponent vectors appearing in a collection of monomials. For example, consider the polynomial of the form $axy%2Bbx^2%2Bcy^5%2Bd$ with $a,b,c,d \neq 0$ has a lattice equal to the triangle

${\rm conv}(\{(1,1),(2,0),(0,5),(0,0)\}).\$

References

Ezra Miller, Bernd Sturmfels, Combinatorial commutative algebra. Graduate Texts in Mathematics, 227. Springer-Verlag, New York, 2005. xiv+417 pp. ISBN 0-387-22356-8

Convex lattice polytope

Examples

See also

References