On The Largest Character Degree And Solvable Subgroups Of Finite Groups
Abstract
Let G be a finite group, and π be a set of primes. The π-core Oπ(G) is the unique maximal normal π-subgroup of G, and b(G) is the largest irreducible character degree of G. In 2017, Qian and Yang proved that if H is a solvable π-subgroup of G, then |HOπ(G)/Oπ(G)| b(G)3. In this paper, we improve the exponent of 3 to 3504(168)<2.471.
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