Growth rates of permutation classes: from countable to uncountable
Abstract
We establish that there is an algebraic number ≈ 2.30522 such that while there are uncountably many growth rates of permutation classes arbitrarily close to , there are only countably many less than . Central to the proof are various structural notions regarding generalized grid classes and a new property of permutation classes called concentration. The classification of growth rates up to is completed in a subsequent paper.
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