Convergence of iterated Aluthge transform sequence for diagonalizable matrices II: λ-Aluthge transform

Abstract

Let λ ∈ (0,1) and let T be a r× r complex matrix with polar decomposition T=U|T|. Then, the - Aluthge transform is defined by λ (T )= |T|λ U |T |1-λ. Let λn(T) denote the n-times iterated Aluthge transform of T, n∈N. We prove that the sequence \λn(T)\n∈N converges for every r× r diagonalizable matrix T. We show regularity results for the two parameter map (, T) ∞T, and we study for which matrices the map (0,1) λ λ∞(T) is constant.