Joint spectra of spherical Aluthge transforms of commuting n-tuples of Hilbert space operators

Abstract

Let T (T1,·s,Tn) be a commuting n-tuple of operators on a Hilbert space H, and let Ti Vi P \; (1 i n) be its canonical joint polar decomposition (i.e., P:=T1*T1+·s+Tn*Tn, (V1,·s,Vn) a joint partial isometry, and i=1n Ti = i=1n Vi = P). \ The spherical Aluthge transform of T is the (necessarily commuting) n-tuple T:=(PV1P,·s,PVnP). \ We prove that σT(T)=σT(T), where σT denotes Taylor spectrum. \ We do this in two stages: away from the origin we use tools and techniques from criss-cross commutativity; at the origin we show that the left invertibility of T or T implies the invertibility of P. \ As a consequence, we can readily extend our main result to other spectral systems that rely on the Koszul complex for their definitions.