Gordan's lemma

Gordan's lemma is a lemma in convex geometry and algebraic geometry. It can be stated in several ways.

Let $A$ be a matrix of integers. Let $M$ be the set of non-negative integer solutions of $A\cdot x=0$ . Then there exists a finite subset of vectors in $M$ , such that every element of $M$ is a linear combination of these vectors with non-negative integer coefficients.^[1]
The semigroup of integral points in a rational convex polyhedral cone is finitely generated.^[2]
An affine toric variety is an algebraic variety (this follows from the fact that the prime spectrum of the semigroup algebra of such a semigroup is, by definition, an affine toric variety).

The lemma is named after the mathematician Paul Gordan (1837–1912). Some authors have misspelled it as "Gordon's lemma".

^ Alon, N; Berman, K.A (1986-09-01). "Regular hypergraphs, Gordon's lemma, Steinitz' lemma and invariant theory". Journal of Combinatorial Theory, Series A. 43 (1): 91–97. doi:10.1016/0097-3165(86)90026-9. ISSN 0097-3165.
^ David A. Cox, Lectures on toric varieties. Lecture 1. Proposition 1.11.