Finding involutions with small support
Abstract
We show that the proportion of permutations g in Sn or An such that g has even order and g|g|/2 is an involution with support of cardinality at most n is at least a constant multiple of . Using this result, we obtain the same conclusion for elements in a classical group of natural dimension n in odd characteristic that have even order and power up to an involution with (-1)-eigenspace of dimension at most n for a linear or unitary group, or 2 n/2 for a symplectic or orthogonal group.
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