Small families of partially shattering permutations
Abstract
We say that a family of permutations t-shatters a set if it induces at least t distinct permutations on that set. What is the minimum number fk(n,t) of permutations of \1, …, n\ that t-shatter all subsets of size k? For t 2, fk(n,t) = (1). Spencer showed that fk(n,t) = ( n) for 3 t k and fk(n,k!) = ( n). In 1996, F\"uredi asked whether partial shattering with permutations must always fall into one of these three regimes. Johnson and Wickes recently settled the case k = 3 affirmatively and proved that fk(n,t) = ( n) for t > 2 (k-1)!. We give a surprising negative answer to the question of F\"uredi by showing that a fourth regime exists for k 4. We establish that fk(n,t) = ( n) for certain values of t and prove that this is the only other regime when k = 4. We also show that fk(n,t) = ( n) for t > 2k-1. This greatly narrows the range of t for which the asymptotic behaviour of fk(n,t) is unknown.
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