Convergence over fractals for the periodic Schr\"odinger equation

Abstract

We consider a fractal refinement of Carleson's problem for pointwise convergence of solutions to the periodic Schr\"odinger equation to their initial datum. For α ∈ (0,d] and \[ s < d2(d+1) (d + 1 - α), \] we find a function in Hs(Td) whose corresponding solution diverges in the limit t 0 on a set with strictly positive α-Hausdorff measure. We conjecture this regularity threshold to be optimal. We also prove that \[ s > d2(d+2)( d+2-α ) \] is sufficient for the solution corresponding to every datum in Hs( Td) to converge to such datum α-almost everywhere.