The iterated Aluthge Transforms of compact operators

Abstract

Let T be a bounded linear operator on a Hilbert space. Then the Aluthge transform T and the sequence (nT) of Aluthge iterates of T are defined by align* T=|T|1/2U|T|1/2,\,0T=T,\,nT=(n-1T),\,n∈N. align* We prove that is a continuous map on the space of all compact operators on a separable Hilbert space with respect to the norm topology and using this result we also prove that the sequence (nT) converges in the norm topology to a normal compact operator for every compact operator T on a separable Hilbert space. This gives an affirmative answer to two questions raised by Jung, Ko and Pearcy Pearcy2 for compact operators.