Extremal unipotent representations for the finite Howe correspondence
Abstract
We study the Howe correspondence for unipotent representations of irreducible dual pairs (G',G)=(Um(Fq),Un(Fq)) and (G',G)=(Sp2m(Fq),Oε2n(Fq)), where Fq denotes the finite field with q elements (q odd) and ε= 1. We show how to extract extremal (i.e. minimal and maximal) irreducible subrepresentations from the image of π under the correpondence of a unipotent representation π of G.
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