A bound for the shortest reset words for semisimple synchronizing automata via the packing number
Abstract
We show that if a semisimple synchronizing automaton with n states has a minimal reachable non-unary subset of cardinality r 2, then there is a reset word of length at most (n-1)D(2,r,n), where D(2,r,n) is the 2-packing number for families of r-subsets of [1,n].
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