On the propagation of high regularity for the logarithmic Schr\"odinger equation

Abstract

We investigate both the instantaneous loss and the persistence of high regularity for the one-dimensional logarithmic Schr\"odinger equation in symmetric domains under various boundary conditions. We show that for a broad class of odd initial data, the Hs-norm of solutions exhibits instantaneous blow-up for all s > 7/2 . Conversely, we establish that H3-regularity is preserved for solutions that are odd with first-order cancellation, non-vanishing behavior away from the origin and Neumann boundary conditions on symmetric bounded domains. These theoretical results are further supported and illustrated by numerical simulations.