Positive definite functions as uniformly ergodic multipliers of the Fourier algebra

Abstract

Let G be a locally compact group and let φ be a positive definite function on G with φ(e)=1. This function defines a multiplication operator Mφ on the Fourier algebra A(G) of G. The aim of this paper is to classify the ergodic properties of the operators Mφ, focusing on several key factors, including the subgroup Hφ=\x∈ G φ(x)=1\, the spectrum of Mφ, or how ``spread-out'' a power of Mφ can be. We show that the multiplication operator Mφ is uniformly mean ergodic if and only if Hφ is open and 1 is not an accumulation point of the spectrum of Mφ. Equivalently, this happens when some power of φ is not far, in the multiplier norm, from a function supported on finitely many cosets of Hφ. Additionally, we show that the powers of Mφ converge in norm if, and only if, the operator is uniformly mean ergodic and Hφ =\x∈ G |φ(x)|=1\.

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