On Modular Invariants of A Vector and A Covector

Abstract

Let SL2(Fq) be the special linear group over a finite field Fq, V be the 2-dimensional natural representation of SL2(Fq) and V be the dual representation. We denote by Fq[V V]SL2(Fq) the corresponding invariant ring of a vector and a covector for SL2(Fq). In this paper, we construct a free module basis over some homogeneous system of parameters of Fq[V V]SL2(Fq). We calculate the Hilbert series of Fq[V V]SL2(Fq), and prove that it is a Gorenstein algebra. As an application, we confirm a special case of the recent conjecture of Bonnafe and Kemper in 2011.