Teorema de Erdős–Ko–Rado

Erdős–Ko–Rado theorem In combinatorics, the Erdős–Ko–Rado theorem of Paul Erdős, Chao Ko, and Richard Rado is a theorem on intersecting set families.

The theorem is as follows. Suppose that A is a family of distinct subsets of {estilo de exibição {1,2,...,n}} such that each subset is of size r and each pair of subsets has a nonempty intersection, and suppose that n ≥ 2r. Then the number of sets in A is less than or equal to the binomial coefficient {estilo de exibição {alguns deles {n-1}{r-1}}.} The result is part of the theory of hypergraphs. A family of sets may also be called a hypergraph, and when all the sets (which are called "hyperedges" in this context) are the same size r, it is called an r-uniform hypergraph. The theorem thus gives an upper bound for the number of pairwise non-disjoint hyperedges in an r-uniform hypergraph with n vertices and n ≥ 2r.

The theorem may also be formulated in terms of graph theory: the independence number of the Kneser graph KGn,r for n ≥ 2r is {alfa de estilo de exibição (KG_{n,r})={alguns deles {n-1}{r-1}}.} According to Erdős (1987) the theorem was proved in 1938, but was not published until 1961 in an apparently more general form. The subsets in question were only required to be size at most r, and with the additional requirement that no subset be contained in any other.

A version of the theorem also holds for signed sets (Bollobás & Leader 1997) Conteúdo 1 Prova 2 Families of maximum size 3 Maximal intersecting families 4 Intersecting families of subspaces 5 Relation to graphs in association schemes 6 References Proof The original proof of 1961 used induction on n. Dentro 1972, Gyula O. H. Katona gave the following short proof using double counting.

Suppose we have some such family of subsets A. Arrange the elements of {1, 2, ..., n} in any cyclic order, and consider the sets from A that form intervals of length r within this cyclic order. For example if n = 8 and r = 3, we could arrange the numbers {1, 2, ..., 8} into the cyclic order (3,1,5,4,2,7,6,8), which has eight intervals: (3,1,5), (1,5,4), (5,4,2), (4,2,7), (2,7,6), (7,6,8), (6,8,3), e (8,3,1).

No entanto, it is not possible for all of the intervals of the cyclic order to belong to A, because some pairs of them are disjoint. Katona's key observation is that at most r of the intervals for a single cyclic order may belong to A. Para ver isso, note that if (a1, a2, ..., ar) is one of these intervals in A, then every other interval of the same cyclic order that belongs to A separates ai and ai+1 for some i (isso é, it contains precisely one of these two elements). The two intervals that separate these elements are disjoint, so at most one of them can belong to A. Desta forma, the number of intervals in A is one plus the number of separated pairs, which is at most (r - 1).

Based on this idea, we may count the number of pairs (S,C), where S is a set in A and C is a cyclic order for which S is an interval, in two ways. Primeiro, for each set S one may generate C by choosing one of r! permutations of S and (n − r)! permutations of the remaining elements, showing that the number of pairs is |UMA|r!(n − r)!. And second, existem (n - 1)! cyclic orders, each of which has at most r intervals of A, so the number of pairs is at most r(n - 1)!. Combining these two counts gives the inequality {estilo de exibição |UMA|r!(n-r)!ler(n-1)!} and dividing both sides by r!(n − r)! gives the result {estilo de exibição |UMA|leq {fratura {r(n-1)!}{r!(n-r)!}}={n-1 choose r-1}.} Two constructions for an intersecting family of r-sets: fix one element and choose the remaining elements in all possible ways, ou (when n = 2r) exclude one element and choose all subsets of the remaining elements. Here n = 4 and r = 2. Families of maximum size There are two different and straightforward constructions for an intersecting family of r-element sets achieving the Erdős–Ko–Rado bound on cardinality. Primeiro, choose any fixed element x, and let A consist of all r-subsets of {estilo de exibição {1,2,...,n}} that include x. Por exemplo, if n = 4, r = 2, and x = 1, this produces the family of three 2-sets {1,2}, {1,3}, {1,4}.

Any two sets in this family intersect, because they both include x. Segundo, when n = 2r and with x as above, let A consist of all r-subsets of {estilo de exibição {1,2,...,n}} that do not include x. For the same parameters as above, this produces the family {2,3}, {2,4}, {3,4}.

Any two sets in this family have a total of 2r = n elements among them, chosen from the n − 1 elements that are unequal to x, so by the pigeonhole principle they must have an element in common.

When n > 2r, families of the first type (variously known as sunflowers, stars, dictatorships, centred families, principal families) are the unique maximum families. Friedgut (2008) proved that in this case, a family which is almost of maximum size has an element which is common to almost all of its sets. This property is known as stability.

The seven points and seven lines (one drawn as a circle) of the Fano plane form a maximal intersecting family. Maximal intersecting families An intersecting family of r-element sets may be maximal, in that no further set can be added without destroying the intersection property, but not of maximum size. An example with n = 7 and r = 3 is the set of 7 lines of the Fano plane, much less than the Erdős–Ko–Rado bound of 15.

Intersecting families of subspaces There is a q-analog of the Erdős–Ko–Rado theorem for intersecting families of subspaces over finite fields. Frankl & Wilson (1986) Se {estilo de exibição S} is an intersecting family of {estilo de exibição k} -dimensional subspaces of an {estilo de exibição m} -dimensional vector space over a finite field of order {estilo de exibição q} , e {displaystyle ngeq 2k} , então {displaystyle vert Svert leq {alguns deles {n-1}{k-1}}_{q}.} Relation to graphs in association schemes The Erdős–Ko–Rado theorem gives a bound on the maximum size of an independent set in Kneser graphs contained in Johnson schemes.[citação necessária] De forma similar, the analog of the Erdős–Ko–Rado theorem for intersecting families of subspaces over finite fields gives a bound on the maximum size of an independent set in q-Kneser graphs contained in Grassmann schemes.[citação necessária] References Bollobás, B.; Leader, EU. (1997), "An Erdős-Ko-Rado theorem for signed sets", Computers and Mathematics with Applications, 34 (11): 9–13, doi:10.1016/S0898-1221(97)00215-0, SENHOR 1486880 Floresta, P. (1987), "My joint work with Richard Rado", in Whitehead, C. (ed.), Surveys in combinatorics, 1987: Invited Papers for the Eleventh British Combinatorial Conference (PDF), Série de notas de palestras da London Mathematical Society, volume. 123, Cambridge University Press, pp. 53–80, ISBN 978-0-521-34805-8. Floresta, P.; Ko, C.; Rado, R. (1961), "Intersection theorems for systems of finite sets" (PDF), Revista Trimestral de Matemática, Segunda Série, 12: 313-320, doi:10.1093/qmath/12.1.313. Frankl, P.; Wilson, R. M. (1986), "The Erdős-Ko-Rado theorem for vector spaces", Jornal de Teoria Combinatória, Série A, 43 (2): 228-236, doi:10.1016/0097-3165(86)90063-4. Friedgut, Ehud (2008), "On the measure of intersecting families, uniqueness and stability" (PDF), Combinatória, 28 (5): 503–528, doi:10.1007/s00493-008-2318-9, S2CID 7225916 Soldado, G. O. H. (1972), "A simple proof of the Erdös-Chao Ko-Rado theorem", Jornal de Teoria Combinatória, Série B, 13 (2): 183-184, doi:10.1016/0095-8956(72)90054-8. Godsil, Christopher; Karen, Meagher (2015), Erdős–Ko–Rado Theorems: Algebraic Approaches, Estudos de Cambridge em Matemática Avançada, Cambridge University Press, ISBN 9781107128446. Categorias: Set familiesTheorems in discrete mathematicsFactorial and binomial topicsPaul Erdős

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