Spectral decomposition of power-bounded operators: The finite spectrum case

Abstract

In this paper, we investigate power-bounded operators, including surjective isometries, on Banach spaces. Koehler and Rosenthal asserted that an isolated point in the spectrum of a surjective isometry on a Banach space lies in the point spectrum, with the corresponding eigenspace having an invariant complement. However, they did not provide a detailed proof of this claim, at least as understood by the authors of this manuscript. Here, by applications of a theorem of Gelfand and the Riesz projections, we demonstrate that the theorem of Koehler and Rosenthal holds for any power-bounded operator on a Banach space. This not only furnishes a detailed proof of the theorem but also slightly generalizes its scope. As a result, we establish that if T: X X is a power-bounded operator on a Banach space X whose spectrum consists of finitely many points λ1, λ2, …, λm, then for every 1 ≤ i, j ≤ m, there exist projections Pj on X such that PiPj=δijPi, Σj=1mPj=I, and T=j=1m λj Pj. It follows that such an operator T is an algebraic operator.