Ranks of linear matrix pencils separate simultaneous similarity orbits

Abstract

This paper solves the two-sided version and provides a counterexample to the general version of the 2003 conjecture by Hadwin and Larson. Consider evaluations of linear matrix pencils L=T0+x1T1+·s+xmTm on matrix tuples as L(X1,…,Xm)=I T0+X1 T1+·s+Xm Tm. It is shown that ranks of linear matrix pencils constitute a collection of separating invariants for simultaneous similarity of matrix tuples. That is, m-tuples A and B of n× n matrices are simultaneously similar if and only if the ranks of L(A) and L(B) are equal for all linear matrix pencils L of size mn. Variants of this property are also established for symplectic, orthogonal, unitary similarity, and for the left-right action of general linear groups. Furthermore, a polynomial time algorithm for orbit equivalence of matrix tuples under the left-right action of special linear groups is deduced.