On generating the ring of matrix semi-invariants

Abstract

For a field F, let R(n, m) be the ring of invariant polynomials for the action of SL(n, F) × SL(n, F) on tuples of matrices -- (A, C)∈SL(n, F) × SL(n, F) sends (B1, …, Bm)∈ M(n, F) m to (AB1C-1, …, ABmC-1). In this paper we call R(n, m) the ring of matrix semi-invariants. Let β(R(n, m)) be the smallest D s.t. matrix semi-invariants of degree ≤ D generate R(n, m). Guided by the Procesi-Razmyslov-Formanek approach of proving a strong degree bound for generating matrix invariants, we exhibit several interesting structural results for the ring of matrix semi-invariants R(n, m) over fields of characteristic 0. Using these results, we prove that β(R(n, m))=(n3/2), and β(R(2, m))≤ 4.