Chaotic Dynamics of the heat semigroup on the Damek-Ricci spaces

Abstract

The Damek-Ricci spaces are solvable Lie groups and noncompact harmonic manifolds. The rank one Riemannian symmetric spaces of noncompact type sits inside it as a thin subclass. In this note we establish that for any Damek-Ricci space S, the heat semigroup generated by certain perturbation of the Laplace-Beltrami operator is chaotic on the Lorentz spaces Lp,q(S), 2<p<∞, 1 q<∞ and subspace-chaotic on the weak Lp-spaces. We show that both the amount of perturbation and the range of p are sharp. This generalizes a result in J-W which proves that under identical conditions, the heat semigroup mentioned above is subspace-chaotic on the Lp-spaces of the symmetric spaces.