On degenerate Whittaker space for GL4(o2)

Abstract

Let o2 be a finite principal ideal local ring of length 2. For a representation π of GL4(o2), the degenerate Whittaker space πN, is a representation of GL2(o2). We describe πN, explicitly for an irreducible strongly cuspidal representation π of GL4(o2). This description verifies a special case of a conjecture of Prasad. We also prove that πN, is a multiplicity free representation.

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