Pointwise convergence of solutions of the Schr\"odinger equation along general curves on Damek-Ricci spaces

Abstract

One of the most celebrated problems in Euclidean Harmonic analysis is the Carleson's problem: determining the optimal regularity of the initial condition f of the Schr\"odinger equation given by equation* cases i∂ u∂ t = u\:,\: (x,t) ∈ Rn × R u(0,·)=f\:, on Rn \:, cases equation* in terms of the index β such that f belongs to the inhomogeneous Sobolev space Hβ(Rn), so that the solution of the Schr\"odinger operator u converges pointwise to f, equation* t 0+ u(x,t)=f(x), almost everywhere. equation* Recently, the author considered the Carleson's problem for the Schr\"odinger equation with radial initial data on Damek-Ricci spaces and obtained the sharp bound up to the endpoint β 1/4. Interpreting the above as convergence along vertical lines, in this article, we consider the problem of pointwise convergence via more general approach paths. By constructing a counter-example on the 3-dimensional Real Hyperbolic space, we show that the solutions of the Schr\"odinger equation, unlike Harmonic functions or solutions of the Heat equation, do not admit any natural wide approach region. We then study their pointwise convergence properties on Damek-Ricci spaces along general curves that satisfy certain H\"older conditions and bilipschitz conditions in the distance from the identity and again obtain the sharp bound up to the endpoint β 1/4. Certain Euclidean analogues are also obtained.

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