Spectral properties of (m;n)-isosymmetric multivariable operators

Abstract

Inspired by recent works on m-isometric and n-symmetric multivariables operators on Hilbert spaces, in this paper we introduce the class of (m, n)-isosymmetric multivariables operators. This new class of operators emerges as a generalization of the m-isometric and n-isosymmetric multioperators. We study this class of operators and give some of their basic properties. In particular, we show that if R ∈ B(d)( H) is an (m,n )-isosymmetric multioperators and Q∈ B(d)( H) is an q-nilpotent multioperators, then R + Q is an (m + 2q - 2,n+2q-1)-isosymmetric multioperators under suitable conditions. Moreover, we give some results about the joint approximate spectrum of an (m,n)-isosymmetric multioperators.