The Invariant Ring Of m Matrices Under The Adjoint Action By a Product Of General Linear Groups

Abstract

Let V=V1 ·s Vn be a vector space over an algebraically closed field K of characteristic zero with (Vi)=di. We study the ring of polynomial invariants K[End(V) m]GLd of m endomorphisms of V under the adjoint action of GLd:=GL(V1) × ·s × GL(Vn). We find that the ring is generated by certain generalized trace monomials TrMσ where M is a multiset with entries in [m]=\1,…, m\ and σ ∈ Smn is a choice of n permutations of [m]. We find that K[End(V) m]GLd is generated by the TrMσ of degree at most 38m(V)6.