Construction of simple quotients of Bernstein-Zelevinsky derivatives and highest derivative multisegments II: Minimal sequences

Abstract

Let F be a non-Archimedean local field. For any irreducible smooth representation π of GLn(F) and a multisegment m, we have an operation D m(π) to construct a simple quotient τ of a Bernstein-Zelevinsky derivative of π. This article continues the previous one to study the following poset \[ S(π, τ) :=\ n : D n(π) τ \ , \] where n runs for all the multisegments. Here the partial ordering on S(π, τ) comes from the Zelevinsky ordering. We show that the poset has a unique minimal multisegment. Along the way, we introduce two new ingredients: fine chain orderings and local minimizability.