The stable representations of GLN over finite local principal ideal rings
Abstract
Let O be a discrete valuation ring with maximal ideal p and with finite residue field Fq, the field with q elements where q is a power of a prime p. For r 1, we write Or for the reduction of O modulo the ideal pr. An irreducible ordinary representation of the finite group GLN(Or) is called stable if its restriction to the principal congruence kernel Kl=1+plMN(Or), where l= r2 , consists of irreducible representations whose stabilizers modulo Kl', where l'=r-l, are centralizers of certain matrices in gl'=MN(Ol'), called stable matrices. The study of stable representations is motivated by constructions of strongly semisimple representations, introduced by Hill, which is a special case of stable representations. In this paper, we explore the construction of stable irreducible representations of the finite group GLN(Or) for N 2.
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