On minimal graphs, fixing sets and base size sets for hamiltonian groups
Abstract
A finite non-abelian group H is hamiltonian if all of its subgroups are normal. We compute the minimal orders of graphs having a hamiltonian group as their automorphism group. Later, we determine the fixing sets and base size sets corresponding to finite hamiltonian groups. As a consequence, we obtain that if H is a hamiltonian group, then the base size set of H is equal to its fixing set.
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