Asymptically full measure sets of almost-periodic solutions for the NLS equation

We study the global dynamics of solutions to a family of nonlinear Schrödinger %(NLS) equations on the circle, with a smooth convolution potential and Gevrey regular initial data. Our main result is the construction of an asymptotically full measure set of time almost-periodic solutions, whose hulls are invariant tori. Specifically, we show that for most choices of the convolution potential there exists a bi-Lipschitz map from a ball in the space of linear solutions to the space of initial data, such that all linear solutions with frequencies satisfying a non-resonance condition are mapped to initial data giving rise to an almost-periodic solution. As a consequence, we establish that the Gevrey norm of many initial data remains approximately constant in time and hence the elliptic fixed point at the origin is Lyapunov statistically stable with respect to such a norm. Furthermore, we construct a Cantor foliation of the phase space, where regions corresponding to positive actions are foliated by invariant maximal tori. This result generalizes the classical KAM theory in the infinite-dimensional setting, providing a statistical description of the global dynamics near the fixed point. Our work suggests that diffusive solutions should be looked for in spaces of lower regularity, in line with recent findings in the theory of Hamiltonian PDEs