Operator roots of polynomials:iso-symmetric operators

Abstract

Given Hilbert space operators Ai, Bi, i=1,2, and X such that A1 commutes with A2 and B! commutes with B2, and integers m, n≥ 1, we say that the pairs of operators (B1,A1) and (B2,A2) are left-(X, (m,n))-symmetric, denoted ((B1,A1),(B2,A2))∈ left-(X,(m,n))- symmetric if Σj=0mΣk=0n (-1)j+k(arrayclcrm\array) (arrayclcrn\array) B1m-jB2n-k X A2n-kA1j=0.An important class of left-(X,(m,n))-symmetric operators is obtained uponchoosing B1=B2=A*1=A*2=A* and X=I: such operators have been called (m,n)-isosymmetric, and a study of the spectral picture and maximal invariant subspaces of (m,n)-isosymmetric operators has been carried out by Stankus St. The current work considers stability under perturbations by commuting nilpotents, and products of commuting, left-(X, (m,n))-symmetric operators. It is seen that (X, (m,n))-isosymmetric Drazin invertible operators A have a particularly interesting structure.