Preset Distinguishing Sequences and Diameter of Transformation Semigroups
Abstract
We investigate the length (n,k) of a shortest preset distinguishing sequence (PDS) in the worst case for a k-element subset of an n-state Mealy automaton. It was mentioned by Sokolovskii that this problem is closely related to the problem of finding the maximal subsemigroup diameter (Tn) for the full transformation semigroup Tn of an n-element set. We prove that (Tn)=2n\n2 n(1+ o(1))\ as n∞ and, using approach of Sokolovskii, find the asymptotics of 2 (n,k) as n,k∞ and k/n a∈ (0,1).
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