Cuspidal representations which are not strongly cuspidal
Abstract
We give a description of all the cuspidal representations of GL4(o2), where o2 is a finite ring coming from the ring of integers in a local field, modulo the square of its maximal ideal p. This shows in particular the existence of representations which are cuspidal, yet are not strongly cuspidal, that is, do not have orbit with irreducible characteristic polynomial mod p. It has been shown by Aubert, Onn, and Prasad that this phenomenon cannot occur for GLn, when n is prime.
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