In mathematics, a separoid is a binary relation between disjoint sets which is stable as an ideal in the canonical order induced by inclusion. Many mathematical objects which appear to be quite different, find a common generalisation in the framework of separoids; e.g., graphs, configurations of convex sets, oriented matroids, and polytopes. Any countable category is an induced subcategory of separoids when they are endowed with homomorphisms[1] (viz., mappings that preserve the so-called minimal Radon partitions).
In this general framework, some results and invariants of different categories turn out to be special cases of the same aspect; e.g., the pseudoachromatic number from graph theory and the Tverberg theorem from combinatorial convexity are simply two faces of the same aspect, namely, complete colouring of separoids.
S
\mid \subseteq2S x 2S
A,B\subseteqS
A\midB\LeftrightarrowB\midA,
A\midB ⇒ A\capB=\varnothing,
A\midB\hbox{and}A'\subsetA ⇒ A'\midB.
A related pair
A\midB
\varphi\colonS\toT
A,B\subseteqT
A\midB ⇒ \varphi-1(A)\mid\varphi-1(B).
Examples of separoids can be found in almost every branch of mathematics.[3] [4] [5] Here we list just a few.
1. Given a graph G=(V,E), we can define a separoid on its vertices by saying that two (disjoint) subsets of V, say A and B, are separated if there are no edges going from one to the other; i.e.,
A\midB\Leftrightarrow\foralla\inA\hbox{and}b\inB\colonab\not\inE.
2. Given an oriented matroid[5] M = (E,T), given in terms of its topes T, we can define a separoid on E by saying that two subsets are separated if they are contained in opposite signs of a tope. In other words, the topes of an oriented matroid are the maximal separations of a separoid. This example includes, of course, all directed graphs.
3. Given a family of objects in a Euclidean space, we can define a separoid in it by saying that two subsets are separated if there exists a hyperplane that separates them; i.e., leaving them in the two opposite sides of it.
4. Given a topological space, we can define a separoid saying that two subsets are separated if there exist two disjoint open sets which contains them (one for each of them).
Every separoid can be represented with a family of convex sets in some Euclidean space and their separations by hyperplanes.