Ashish Mishra, Digjoy Paul, Pooja Singla
Published 2022-07-04Version 1
Let $G$ be a finite group and $p$ be a prime number dividing the order of $G$. An irreducible character $\chi$ of $G$ is called a quasi $p$-Steinberg character if $\chi(g)$ is nonzero for every $p$-regular element $g$ in $G$. In this paper, we classify quasi $p$-Steinberg characters of the complex reflection groups $G(r,q,n)$. In particular, we obtain this classification for Weyl groups of type $B_n$ and type $D_n$.
Comments: 14 pages. Comments welcome
Orders of elements and zeros and heights of characters in a finite group
Mackey's theory of $τ$-conjugate representations for finite groups. APPENDIX: On Some Gelfand Pairs and Commutative Association Schemes
Centers of Hecke Algebras of Complex Reflection Groups
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