Daniel Fuster (∂'Alembert)

In this talk, we will demonstrate that errors can arise not only from the discretization of continuum operators but also from the modeling choices made to obtain a solution. This is particularly relevant in solvers relying on the one-fluid approach, continuum surface tension models, or the projection of singular forces onto a grid. By introducing an additional length scale in the model—larger than the grid size—we will analyze the relative contributions of these errors in various problems involving the solution of elliptic equations. We will show that regularization errors can be suppressed to arbitrary order, enabling the accurate representation of discontinuous solutions using relatively large band filters. Additionally, I will present preliminary results on the potential of the proposed methods to enhance the accuracy of numerical simulations for multicomponent systems.