Abstract
Let G be a finite p-solvable group, where p is an odd prime. Suppose that 2 Irr(G) lifts an irreducible p-Brauer character. If G=N is a p-group, then we prove that the irreducible constituents of N lift irreducible Brauer characters of N . This result was proven for jGj odd by J.P. Cossey.
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