Minimum Size of a Poset Realizing 2×2n as its Automorphism Group
Abstract
We study the realization of finite groups as automorphism groups of finite posets. Given a finite group G, let β(G) denote the smallest number of elements in a poset P with (P) G. While β(G) is known for several cyclic and small abelian groups, the non-cyclic abelian case is largely open. In this paper we prove that β(2×2n)=2\,n+1+2 for every n 3.
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