Ext Groups between Irreducible GLn(q)-modules in Cross Characteristic

Abstract

Let G=GLn(q) be the general linear group over the finite field Fq of q elements, and let k be an algebraically closed field of characteristic r >0 such that r does not divide q(q-1). In 1999, Cline, Parshall, and Scott showed that under these assumptions, cohomology calculations for G may be translated to Exti calculations over a q-Schur algebra. The aim of this paper is to extend the results of Cline, Parshall, and Scott and show that Exti calculations for GLn(q) may also be translated to Exti calculations over an appropriate q-Schur algebra (both for i=1 and i>1). To that end, we establish formulas relating certain Ext groups for GLn(q) to Ext groups for the q-Schur algebra Sq(n,n)k. As a consequence, we show that there are no non-split self-extensions of irreducible kG-modules belonging to the unipotent principal Harish-Chandra series. As an application in higher degree, we describe a method which yields vanishing results for higher Ext groups between irreducible kG-modules and demonstrate this method in a series of examples.