Spectral integration from dominated ergodic estimates (Q1305183)

Suppose that \((\Omega,{\mathcal M},\mu)\) is a \(\sigma\)-finite measure space, \(1<p<\infty\), and \(T: L^p(\mu)\to L^p(\mu)\) is a bounded, invertible, separation-preserving linear operator such that the two-sided ergodic means of the linear modulus of \(T\) are uniformly bounded in norm. Using the spectral structure of \(T\), we obtain a functional calculus for \(T\) associated with the algebra of Marcinkiewicz multipliers defined on the unit circle.