On the maximum degree of induced subgraphs of the Kneser graph

Abstract

For integers n ≥ k ≥ 1, the Kneser graph K(n, k) is the graph with vertex-set consisting of all the k-element subsets of \1,2,…,n\, where two k-element sets are adjacent in K(n,k) if they are disjoint. We show that if (n,k,s) ∈ N3 with n > 10000 k s5 and F is set of vertices of K(n,k) of size larger than \A ⊂ \1,2,…,n\:\ |A|=k,\ A \1,2,…,s\ ≠ \, then the subgraph of K(n,k) induced by F has maximum degree at least \[ (1 - O(s3 k/n))ss+1 · n-k k · |F|nk.\] This is sharp up to the behaviour of the error term O(s3 k/n). In particular, if the triple of integers (n, k, s) satisfies the condition above, then the minimum maximum degree does not increase `continuously' with |F|. Instead, it has s jumps, one at each time when |F| becomes just larger than the union of i stars, for i = 1, 2, …, s. An appealing special case of the above result is that if F is a family of k-element subsets of \1,2,…,n\ with |F| = n-1 k-1+1, then there exists A ∈ F such that F is disjoint from at least (1/2-O(k/n))n-k-1 k-1 of the other sets in F; this is asymptotically sharp if k=o(n). Frankl and Kupavskii, using different methods, have recently proven closely related results under the hypothesis that n is at least quadratic in k.

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