Finite groups and degrees of irreducible monomial characters II

Abstract: Let [Formula: see text] be a finite solvable group, and let [Formula: see text] be a prime. We obtain some conditions for [Formula: see text] to be [Formula: see text]-nilpotent or [Formula: see text]-closed in terms of irreducible monomial characters.

“…This has been verified for all solvable groups G with |cd(G)| ≤ 5 ([9, Main Theorem]) and for all finite groups of odd order ([1, Theorem 2.4]). However, much less is known about how the set mcd(G) influences G. Linna Pang and Jiakuan Lu recently made progress in this direction (see [11] and [12]), and we shall use their results heavily.…”

On super-monomial characters and groups having two irreducible monomial character degrees

“…This has been verified for all solvable groups G with |cd(G)| ≤ 5 ([9, Main Theorem]) and for all finite groups of odd order ([1, Theorem 2.4]). However, much less is known about how the set mcd(G) influences G. Linna Pang and Jiakuan Lu recently made progress in this direction (see [11] and [12]), and we shall use their results heavily.…”

On super-monomial characters and groups having two irreducible monomial character degrees

Monomial characters of finite solvable groups