English

On the class $(W_{e})$-operators

Spectral Theory 2021-05-06 v1

Abstract

It is well known that an hyponormal operator satisfies Weyl's theorem. A result due to Conway shows that the essential spectrum of a normal operator NN consists precisely of all points in its spectrum except the isolated eigenvalues of finite multiplicity, that's σe(N)=σ(N)E0(N).\sigma_{e}(N)=\sigma(N)\setminus E^0(N). In this paper, we define and study a new class named (We)(W_{e}) of operators satisfying σe(T)=σ(T)E0(T),\sigma_{e}(T)=\sigma(T)\setminus E^0(T), as a subclass of (W).(W). A countrexample shows generally that an hyponormal does not belong to the class (We),(W_{e}), and we give an additional hypothesis under which an hyponormal belongs to the class (We).(W_{e}). We also give the generalisation class (gWe)(gW_{e}) in the contexte of B-Fredholm theory, and we characterize (Be),(B_{e}), as a subclass of (B),(B), in terms of localized SVEP.

Keywords

Cite

@article{arxiv.2105.02131,
  title  = {On the class $(W_{e})$-operators},
  author = {Zakariae Aznay and Hassan Zariouh},
  journal= {arXiv preprint arXiv:2105.02131},
  year   = {2021}
}
R2 v1 2026-06-24T01:48:26.737Z