The Minimum Size of a Poset Realizing Z2 × Z4 as its Automorphism Group

Abstract

For a finite group G, let β(G) denote the minimum cardinality |P| among finite posets P whose automorphism group (P) is isomorphic to G. While every finite group is realizable as the automorphism group of some finite poset, exact values of β(G) are known only in special cases, most notably for cyclic groups. In this paper we prove that β(Z2 × Z4) = 14; in particular, the product bound β(G × H) β(G) + β(H) is sharp in this case. The upper bound is realized by an explicit 14-element poset P14, whose automorphism group is computed by a height-function argument together with a rigidity analysis of its covering relations. The lower bound, which constitutes the substantive part of the proof, is established by a case analysis of the orbit decompositions of a hypothetical poset on at most 13 points under a faithful G-action, organized according to the largest orbit size; in each case we construct an order-automorphism outside the given copy of G, contradicting (P) G. Among non-cyclic groups, to our knowledge this is the first exact determination of β(G) whose lower bound requires a structural analysis of this kind: for the other non-cyclic abelian groups of order at most 8, namely Z2 × Z2 and Z23, the value of β is elementary. The arguments are closely adapted to the subgroup lattice of Z2 × Z4.