We prove that every finite group $G$ can be realized as the automorphism group of a poset with $4|G|$ points. We also provide bounds for the minimum number of points of a poset with cyclic automorphism group of a given prime power order.
Smallest posets with given cyclic automorphism group
Any Finite Group is the Group of Some Binary, Convex Polytope
Graphs with $2^n+6$ vertices and cyclic automorphism group of order $2^n$
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