Helly family

In combinatorics, a Helly family of order $k$ is a family of sets in which every minimal subfamily with an empty intersection has $k$ or fewer sets in it. Equivalently, every finite subfamily such that every $k$ -fold intersection is non-empty has non-empty total intersection.^[1] The $k$ -Helly property is the property of being a Helly family of order $k$ .^[2]

The number $k$ is frequently omitted from these names in the case that $k = 2$ . Thus, a set-family has the Helly property if, for every $n$ sets $s_{1},\ldots ,s_{n}$ in the family, if $\forall i,j\in [n]:s_{i}\cap s_{j}\neq \emptyset$ , then $s_{1}\cap \cdots \cap s_{n}\neq \emptyset$ .

These concepts are named after Eduard Helly (1884–1943); Helly's theorem on convex sets, which gave rise to this notion, states that convex sets in Euclidean space of dimension $n$ are a Helly family of order $n + 1$ .^[1]

^ ^a ^b Bollobás, Béla (1986), Combinatorics: Set Systems, Hypergraphs, Families of Vectors, and Combinatorial Probability, Cambridge University Press, p. 82, ISBN 9780521337038.
^ Duchet, Pierre (1995), "Hypergraphs", in Graham, R. L.; Grötschel, M.; Lovász, L. (eds.), Handbook of combinatorics, Vol. 1, 2, Amsterdam: Elsevier, pp. 381–432, MR 1373663. See in particular Section 2.5, "Helly Property", pp. 393–394.

[b86-1] Bollobás, Béla (1986), Combinatorics: Set Systems, Hypergraphs, Families of Vectors, and Combinatorial Probability, Cambridge University Press, p. 82, ISBN 9780521337038.

[d95-2] Duchet, Pierre (1995), "Hypergraphs", in Graham, R. L.; Grötschel, M.; Lovász, L. (eds.), Handbook of combinatorics, Vol. 1, 2, Amsterdam: Elsevier, pp. 381–432, MR 1373663. See in particular Section 2.5, "Helly Property", pp. 393–394.

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