Classifying Solvable Primitive Permutation Groups of Low Rank
Abstract
Suppose that G is a finite, transitive, solvable permutation group acting on a set S with n elements. Let G0 be the stabilizer of a point α ∈ . Define the rank of a permutation group, denoted r(G), as the number of distinct orbits of G0 in S (including the trivial orbit \α\). Huppert Huppert and Foulser Foulser classified all finite, solvable, permutation groups of rank two and three respectively, and Foulser restricted the rank four groups to a small list of possibilities. This paper completes the classification of all groups of rank less than 5 by explicitly confirming these past results and computationally constructing the groups of rank 4.
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