Counting stabilized-interval-free permutations
Abstract
A stabilized-interval-free (SIF) permutation on [n]=1,2,...,n is one that does not stabilize any proper subinterval of [n]. By presenting a decomposition of an arbitrary permutation into a list of SIF permutations, we show that the generating function A(x) for SIF permutations satisfies the defining property: [x(n-1)] A(x)n = n! . We also give an efficient recurrence for counting SIF permutations.
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