Regularity and pointwise convergence for dispersive equations with asymptotically concave phase on Damek-Ricci spaces

Abstract

We study the Carleson's problem on Damek-Ricci spaces S for dispersive equations: equation* cases i∂ u∂ t +(-L )u=0\:,\: (x,t) ∈ S × R \:, \\ u(0,·)=f\:,\: on S \:, cases equation* where L= , the Laplace-Beltrami operator or , the shifted Laplace-Beltrami operator, so that the corresponding phase function satisfies for some a ∈ (0,1), the large frequency asymptotic: equation* (λ)=λa + O(1)\:,\:\: λ 1\:. equation* For almost everywhere pointwise convergence of the solution u to its radial initial data f, we obtain the almost sharp regularity threshold β>a/4. This result is new even for Rn and in the special case of the fractional Schr\"odinger equations, generalizes classical Euclidean results of Walther.