Irredundant bases for soluble groups
Abstract
Let be a finite set and G be a subgroup of Sym(). An irredundant base for G is a sequence of points of yielding a strictly descending chain of pointwise stabilisers, terminating with the trivial group. Suppose that G is primitive and soluble. We determine asymptotically tight bounds for the maximum length of an irredundant base for G. Moreover, we disprove a conjecture of Seress on the maximum length of an irredundant base constructed by the natural greedy algorithm, and prove Cameron's Greedy Conjecture for |G| odd.
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