Saturation rank for nilradical of parabolic subalgebras in Type A

Abstract

Let (d) be a standard parabolic subalgebra of n+1(K) and be the corresponding nilradical defined over an algebraically closed field K of characteristic p>0. We construct a finite connected quiver Q(d), through which we provide a combinatorial characterization of the centralizer c(x(d)) of the Richardson element x(d). We specifically focus on the centralizer when the levi factor of (d) is determined by either one or two simple roots. This allows us to demonstrate that, under certain mild restrictions, the saturation rank of equals the semisimple rank of the algebraic K-group n+1(K).

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