Sylow subgroups and the number of irreducible characters of degrees divisible by a prime p

Abstract

Let G be a finite group and p a prime. We establish an upper bound for the derived length of a Sylow p-subgroup of G in terms of the number of irreducible characters of G whose degrees are divisible by p. We also prove that if B is a p-block of a finite p-solvable group G with defect group D, then the derived length of D is at most one more than the number of ordinary irreducible characters of positive height in B.

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