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A characterisation of nilpotent blocks

Gabriel NavarroMarkus LinckelmannRadha Kessar

subject

Finite groupApplied MathematicsGeneral MathematicsSubalgebraZero (complex analysis)Group Theory (math.GR)Prime (order theory)CombinatoricsNilpotentCharacter (mathematics)FOS: MathematicsAbelian groupNilpotent groupRepresentation Theory (math.RT)QAMathematics - Group TheoryMathematics - Representation TheoryMathematics

description

Let $B$ be a $p$-block of a finite group, and set $m=$ $\sum \chi(1)^2$, the sum taken over all height zero characters of $B$. Motivated by a result of M. Isaacs characterising $p$-nilpotent finite groups in terms of character degrees, we show that $B$ is nilpotent if and only if the exact power of $p$ dividing $m$ is equal to the $p$-part of $|G:P|^2|P:R|$, where $P$ is a defect group of $B$ and where $R$ is the focal subgroup of $P$ with respect to a fusion system $\CF$ of $B$ on $P$. The proof involves the hyperfocal subalgebra $D$ of a source algebra of $B$. We conjecture that all ordinary irreducible characters of $D$ have degree prime to $p$ if and only if the $\CF$-hyperfocal subgroup of $P$ is abelian.

yearjournalcountryeditionlanguage
2015-06-30
https://dx.doi.org/10.48550/arxiv.1402.5871