In this talk we will discuss the approximation to nonlinear dispersive equations, which asks for low-regularity assumptions on the initial data, both for deterministic and random initial data.
We will put forth a novel time discretization to the nonlinear Schrödinger equation, allowing for a low-regularity approximation, while maintaining good long-time preservation of the mass density and energy on the discrete level.
Higher order extensions will be presented, following new techniques based on decorated tree series expansions, inspired by singular SPDEs.