6533b7d2fe1ef96bd125f33c

RESEARCH PRODUCT

Characters, bilinear forms and solvable groups

Gabriel NavarroJohn Murray

subject

Algebra and Number TheoryBrauer's theorem on induced charactersMathematics::Rings and Algebras010102 general mathematicsBilinear form01 natural sciencesCombinatoricsLift (mathematics)Frobenius–Schur indicatorQuadratic equationSolvable group0103 physical sciences010307 mathematical physics0101 mathematicsMathematics::Representation TheoryIndecomposable moduleMathematics

description

Abstract We prove a number of results about the ordinary and Brauer characters of finite solvable groups in characteristic 2, by defining and using the concept of the extended nucleus of a real irreducible character. In particular we show that the Isaacs canonical lift of a real irreducible Brauer character has Frobenius–Schur indicator +1. We also show that the principal indecomposable module corresponding to a real irreducible Brauer character affords a quadratic geometry if and only if each extended nucleus is a split extension of a nucleus.

yearjournalcountryeditionlanguage
2016-03-01Journal of Algebra
https://doi.org/10.1016/j.jalgebra.2015.10.024