Stanley-Wilf limits are typically exponential
Abstract
For a permutation π, let Sn(π) be the number of permutations on n letters avoiding π. Marcus and Tardos proved the celebrated Stanley-Wilf conjecture that L(π)= n ∞ Sn(π)1/n exists and is finite. Backed by numerical evidence, it has been conjectured by many researchers over the years that L(π)=(k2) for every permutation π on k letters. We disprove this conjecture, showing that L(π)=2k(1) for almost all permutations π on k letters.
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