Characters of symmetric groups: sharp bounds on virtual degrees and the Witten zeta function
classification
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math.COmath.PR
keywords
boundscharactersdegreesfunctiongroupsshalevsharpsymmetric
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We prove sharp bounds on the virtual degrees introduced by Larsen and Shalev. This leads to improved bounds on characters of symmetric groups. We then sharpen bounds of Liebeck and Shalev concerning the Witten zeta function. Our main application is a characterization of the fixed-point free conjugacy classes whose associated random walk mixes in 2 steps.
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Cited by 1 Pith paper
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Cutoff profiles for conjugacy invariant random walks on symmetric groups
Proves Poissonian cutoff profiles for conjugacy-invariant random walks on symmetric groups with macroscopic fixed points and cutoff for random involution walks using character asymptotics.
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