On Quasi Steinberg characters of Complex Reflection Groups
Abstract
Let G be a finite group and p be a prime number dividing the order of G. An irreducible character of G is called a quasi p-Steinberg character if (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 Bn and type Dn.
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