Irredundant bases for the symmetric group
Abstract
An irredundant base of a group G acting faithfully on a finite set is a sequence of points in that produces a strictly descending chain of pointwise stabiliser subgroups in G, terminating at the trivial subgroup. Suppose that G is Sn or An acting primitively on , and that the point stabiliser is primitive in its natural action on n points. We prove that the maximum size of an irredundant base of G is O(n), and in most cases O(( n)2). We also show that these bounds are best possible.
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