Dynamics of Lp multipliers on harmonic manifolds

Abstract

Let X be a complete, simply connected harmonic manifold with sectional curvatures K satisfying K ≤ -1. In biswas6, a Fourier transform was defined for functions on X, and a Fourier inversion formula and Plancherel theorem were proved. We use the Fourier transform to investigate the dynamics on Lp(X) for p > 2 of certain bounded linear operators T : Lp(X) Lp(X) which we call "Lp-multipliers" in accordance with standard terminology. These operators are required to preserve the subspace of Lp radial functions. A notion of convolution with radial functions was defined in biswas6, and these operators are also required to be compatible with convolution in the sense that Tφ * = φ * T for all radial C∞c-functions φ, . They are also required to be compatible with translation of radial functions. Examples of Lp-multipliers are given by the operator of convolution with an L1 radial function, or more generally convolution with a finite radial measure. In particular elements of the heat semigroup et act as multipliers. Given 2 < p < ∞, we show that for any Lp-multiplier T which is not a scalar multiple of the identity, there is an open set of values of ∈ C for which the operator 1 T is chaotic on Lp(X) in the sense of Devaney, i.e. topologically transitive and with periodic points dense. Moreover such operators are topologically mixing. We also show that there is a constant cp > 0 such that for any c ∈ C with c > cp, the action of the shifted heat semigroup ect et on Lp(X) is chaotic. These results generalize the corresponding results for rank one symmetric spaces of noncompact type and negatively curved harmonic NA groups (or Damek-Ricci spaces).