Gordan's lemma

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

• Let ${\displaystyle A}$ be a matrix of integers. Let ${\displaystyle M}$ be the set of non-negative integer solutions of ${\displaystyle A\cdot x=0}$. Then there exists a finite subset of vectors in ${\displaystyle M}$, such that every element of ${\displaystyle M}$ 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".

Proofs

There are topological and algebraic proofs.

Topological proof

Let ${\displaystyle \sigma }$ be the dual cone of the given rational polyhedral cone. Let ${\displaystyle u_1,\dots ,u_r}$ be integral vectors so that ${\displaystyle \sigma =\{x\mid ⟨u_i,x⟩\ge 0,1\le i\le r\}.}$ Then the ${\displaystyle u_i}$'s generate the dual cone ${\displaystyle {\sigma }^{\vee }}$; indeed, writing C for the cone generated by ${\displaystyle u_i}$'s, we have: ${\displaystyle \sigma \subset C^{\vee }}$, which must be the equality. Now, if x is in the semigroup

${\displaystyle S_{\sigma }={\sigma }^{\vee }\cap {\mathbb{\mathbb{Z}}}^d,}$

then it can be written as

${\displaystyle x=\sum _i{n}_i{u}_i+\sum _i{r}_i{u}_i,}$

where ${\displaystyle n_i}$ are nonnegative integers and ${\displaystyle 0\le r_i\le 1}$. But since x and the first sum on the right-hand side are integral, the second sum is a lattice point in a bounded region, and so there are only finitely many possibilities for the second sum (the topological reason). Hence, ${\displaystyle S_{\sigma }}$ is finitely generated.

Algebraic proof

The proof^[3] is based on a fact that a semigroup S is finitely generated if and only if its semigroup algebra ${\displaystyle \mathbb{ℂ}[S]}$ is a finitely generated algebra over ${\displaystyle \mathbb{ℂ}}$. To prove Gordan's lemma, by induction (cf. the proof above), it is enough to prove the following statement: for any unital subsemigroup S of ${\displaystyle {\mathbb{\mathbb{Z}}}^d}$,

If S is finitely generated, then ${\displaystyle S^{+}=S\cap \{x\mid ⟨x,v⟩\ge 0\}}$, v an integral vector, is finitely generated.

Put ${\displaystyle A=\mathbb{ℂ}[S]}$, which has a basis ${\displaystyle {\chi }^a,a\in S}$. It has ${\displaystyle \mathbb{\mathbb{Z}}}$-grading given by

${\displaystyle A_n=\mathrm{span}\{{\chi }^a\mid a\in S,⟨a,v⟩=n\}}$.

By assumption, A is finitely generated and thus is Noetherian. It follows from the algebraic lemma below that ${\displaystyle \mathbb{ℂ}[S^{+}]={\displaystyle \underset{0}{\overset{\mathrm{\infty }}{\oplus }}}{A}_n}$ is a finitely generated algebra over ${\displaystyle A_0}$. Now, the semigroup ${\displaystyle S_0=S\cap \{x\mid ⟨x,v⟩=0\}}$ is the image of S under a linear projection, thus finitely generated and so ${\displaystyle A_0=\mathbb{ℂ}[S_0]}$ is finitely generated. Hence, ${\displaystyle S^{+}}$ is finitely generated then. Lemma: Let A be a ${\displaystyle \mathbb{\mathbb{Z}}}$-graded ring. If A is a Noetherian ring, then ${\displaystyle A^{+}={\displaystyle \underset{0}{\overset{\mathrm{\infty }}{\oplus }}}{A}_n}$ is a finitely generated ${\displaystyle A_0}$-algebra. Proof: Let I be the ideal of A generated by all homogeneous elements of A of positive degree. Since A is Noetherian, I is actually generated by finitely many ${\displaystyle {f_i}^{\prime }s}$, homogeneous of positive degree. If f is homogeneous of positive degree, then we can write $f=\sum _i{g}_i{f}_i$ with ${\displaystyle g_i}$ homogeneous. If f has sufficiently large degree, then each ${\displaystyle g_i}$ has degree positive and strictly less than that of f. Also, each degree piece ${\displaystyle A_n}$ is a finitely generated ${\displaystyle A_0}$-module. (Proof: Let ${\displaystyle N_i}$ be an increasing chain of finitely generated submodules of ${\displaystyle A_n}$ with union ${\displaystyle A_n}$. Then the chain of the ideals ${\displaystyle N_{i}A}$ stabilizes in finite steps; so does the chain ${\displaystyle N_i=N_{i}A\cap A_n.}$) Thus, by induction on degree, we see ${\displaystyle A^{+}}$ is a finitely generated ${\displaystyle A_0}$-algebra.

Applications

A multi-hypergraph over a certain set ${\displaystyle V}$ is a multiset of subsets of ${\displaystyle V}$ (it is called "multi-hypergraph" since each hyperedge may appear more than once). A multi-hypergraph is called regular if all vertices have the same degree. It is called decomposable if it has a proper nonempty subset that is regular too. For any integer n, let ${\displaystyle D(n)}$ be the maximum degree of an indecomposable multi-hypergraph on n vertices. Gordan's lemma implies that ${\displaystyle D(n)}$ is finite.^[1] Proof: for each subset S of vertices, define a variable x_S (a non-negative integer). Define another variable d (a non-negative integer). Consider the following set of n equations (one equation per vertex):$${\displaystyle \sum _{S\ni v}{x}_S-d=0\text{ for all }v\in V}$$Every solution (x,d) denotes a regular multi-hypergraphs on ${\displaystyle V}$, where x defines the hyperedges and d is the degree. By Gordan's lemma, the set of solutions is generated by a finite set of solutions, i.e., there is a finite set ${\displaystyle M}$ of multi-hypergraphs, such that each regular multi-hypergraph is a linear combination of some elements of ${\displaystyle M}$. Every non-decomposable multi-hypergraph must be in ${\displaystyle M}$ (since by definition, it cannot be generated by other multi-hypergraph). Hence, the set of non-decomposable multi-hypergraphs is finite.

See also

• Birkhoff algorithm is an algorithm that, given a bistochastic matrix (a matrix which solves a particular set of equations), finds a decomposition of it into integral matrices. It is related to Gordan's lemma in that it shows that the set of these matrices is generated by a finite set of integral matrices.

References

See also

• Dickson's lemma