Bounding an index by the largest character degree of a solvable group
Abstract
In this paper, we show that if p is a prime and G is a p-solvable group, then | G:Op (G) |p (b(G)p/p)1/(p-1) where b(G) is the largest character degree of G. If p is an odd prime that is not a Mersenne prime or if the nilpotence class of a Sylow p-subgroup of G is at most p, then | G:Op (G) |p b(G).
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