Weyl's theorem for commuting tuple of paranormal and -paranormal operators

Abstract

In this article, we show that a commuting pair T=(T1,T2) of -paranormal operators T1 and T2 with quasitriangular property satisfy the Weyl's theorem-I, that is σT(T)σTW(T)=π00(T) and a commuting pair of paranormal operators satisfy Weyl's theorem-II, that is σT(T)ω(T)=π00(T), where σT(T),\, σTW(T),\,ω(T) and π00(T) are the Taylor spectrum, the Taylor Weyl spectrum, the joint Weyl spectrum and the set consisting of isolated eigenvalues of T with finite multiplicity, respectively. Moreover, we prove that Weyl's theorem-II holds for f(T), where T is a commuting pair of paranormal operators and f is an analytic function in a neighbourhood of σT(T).