Waiting Time Distribution for the Emergence of Superpatterns
Abstract
Consider a sequence X1, X2,... of i.i.d. uniform random variables taking values in the alphabet set 1,2,...,d. A k-superpattern is a realization of X1,...,Xt that contains, as an embedded subsequence, each of the non-order-isomorphic subpatterns of length k. We focus on the non-trivial case of d=k=3 and study the waiting time distribution of tau=inft>=7: X1,...,Xt is a superpattern
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