The Spectral Picture and Joint Spectral Radius of the Generalized Spherical Aluthge Transform

Abstract

For an arbitrary commuting d--tuple of Hilbert space operators, we fully determine the spectral picture of the generalized spherical Aluthge transform and we prove that the spectral radius of can be calculated from the norms of the iterates of . \ Let T (T1,·s,Td) be a commuting d--tuple of bounded operators acting on an infinite dimensional separable Hilbert space, let P:=T1*T1+·s+Td*Td, and let ( arrayc T1 \\ \\ Td array ) = ( arrayc V1 \\ \\ Vd array ) P be the canonical polar decomposition, with (V1,·s,Vd) a (joint) partial isometry and i=1d Ti=i=1d Vi= P. For 0 t 1, we define the generalized spherical Aluthge transform of T by Δt(T):=(Pt V1P1-t, ·s, Pt VdP1-t). We also let \|T\|2:=\|P\|. \ We first determine the spectral picture of Δt(T) in terms of the spectral picture of T; in particular, we prove that, for any 0 t 1, Δt(T) and T have the same Taylor spectrum, the same Taylor essential spectrum, the same Fredholm index, and the same Harte spectrum. \ We then study the joint spectral radius r(T), and prove that r(T)=n\|Δt(n)(T)\|2 \,\, (0 < t < 1), where Δt(n) denotes the n--th iterate of Δt. \ For d=t=1, we give an example where the above formula fails.