Completely Reachable Automata, Primitive Groups and the State Complexity of the Set of Synchronizing Words

“…In [22], the following characterization of the primitive permutation groups, connecting them to completely reachable automata, was shown.…”

“…In the same work [22], in analogy with Theorem 2 and 3, the sync-maximal permutation groups were introduced. Definition 4.…”

“…In [22] it was shown that every sync-maximal permutation groups is primitive. The main result of the present work is that the converse implication holds true.…”

“…In [22,Lemma 3.1] it was shown that distinguishability of all sets reduces to distinguishablity of the 2-subsets. Formulated without reference to automata, this gives the next result.…”

“…It has been proven in [22] that a permutation group of degree n is primitive if and only if in the transformation monoid generated by the group and an arbitrary non-permutation with an image of size n ´1, there exists, for every non-empty subset of the permutation domain, an element mapping the whole permutation domain to this subset, or said differently that an associated automaton is completely reachable. In the same paper [22] the sync-maximal permutation groups were introduced by stipulating that, for an associated n-state automaton, the smallest automaton for the set of synchronizing words has size 2 n ´n. It was shown that the sync-maximal permutation groups are contained between the 2-homogeneous and the primitive permutation groups, and it was posed as an open problem if they are properly contained between them, and if so, what the precise relation to other permutation groups is.…”

Sync-Maximal Permutation Groups Equal Primitive Permutation Groups

“…In [22], the following characterization of the primitive permutation groups, connecting them to completely reachable automata, was shown.…”

“…In the same work [22], in analogy with Theorem 2 and 3, the sync-maximal permutation groups were introduced. Definition 4.…”

“…In [22] it was shown that every sync-maximal permutation groups is primitive. The main result of the present work is that the converse implication holds true.…”

“…In [22,Lemma 3.1] it was shown that distinguishability of all sets reduces to distinguishablity of the 2-subsets. Formulated without reference to automata, this gives the next result.…”

“…It has been proven in [22] that a permutation group of degree n is primitive if and only if in the transformation monoid generated by the group and an arbitrary non-permutation with an image of size n ´1, there exists, for every non-empty subset of the permutation domain, an element mapping the whole permutation domain to this subset, or said differently that an associated automaton is completely reachable. In the same paper [22] the sync-maximal permutation groups were introduced by stipulating that, for an associated n-state automaton, the smallest automaton for the set of synchronizing words has size 2 n ´n. It was shown that the sync-maximal permutation groups are contained between the 2-homogeneous and the primitive permutation groups, and it was posed as an open problem if they are properly contained between them, and if so, what the precise relation to other permutation groups is.…”

Sync-Maximal Permutation Groups Equal Primitive Permutation Groups

State Complexity of the Set of Synchronizing Words for Circular Automata and Automata over Binary Alphabets

Sync-Maximal Permutation Groups Equal Primitive Permutation Groups