Vector invariant fields of finite classical groups

Abstract

Let W be an n-dimensional vector space over a finite field Fq of any characteristic and mW denote the direct sum of m copies of W. Let Fq[mW] GL(W) and Fq(mW) GL(W) denote the vector invariant ring and vector invariant field respectively where GL(W) acts on W in the standard way and acts on mW diagonally. We prove that there exists a set of homogeneous invariant polynomials \f1,f2,…,fmn\⊂eq Fq[mW] GL(W) such that Fq(mW) GL(W)=Fq(f1,f2,…,fmn). We also prove the same assertions for the special linear groups and the symplectic groups in any characteristic, and the unitary groups and the orthogonal groups in odd characteristic.