Sylow branching coefficients and a conjecture of Malle and Navarro
Eugenio Giannelli, Stacey Law, Jason Long, Carolina Vallejo
Abstract
We prove that a finite group G$G$ has a normal Sylow p$p$‐subgroup P$P$ if, and only if, every irreducible character of G$G$ appearing in the permutation character (1P)G$({\bf 1}_P)^G$ with multiplicity coprime to p$p$ has degree coprime to p$p$. This confirms a prediction by Malle and Navarro from 2012. Our proof of the above result depends on a reduction to simple groups and ultimately on a combinatorial analysis of the properties of Sylow branching coefficients for symmetric groups.
Topics & Concepts
Sylow theoremsMathematicsCoprime integersCombinatoricsConjectureMultiplicity (mathematics)Simple groupFinite groupPermutation groupCharacter (mathematics)Permutation (music)Simple (philosophy)Group (periodic table)ChemistryMathematical analysisPhysicsGeometryAcousticsOrganic chemistryEpistemologyPhilosophyFinite Group Theory ResearchCoding theory and cryptographyLimits and Structures in Graph Theory