Published papers:
M. Ferrari, I. Perugia and E. Zampa, Inf–Sup Stable Space–Time Discretization of the Wave Equation Based on a First-Order-In-Time Variational Formulation, Journal of Scientific Computing, 107 (3), 89, 2026
W.M. Boon, W Tonnon, E. Zampa, H (curl)-based approximation of the Stokes problem with weakly enforced no-slip boundary conditions, Computer Methods in Applied Mechanics and Engineering 448, 118484, 2026
A. Stern and E. Zampa., Multisymplecticity in finite element exterior calculus, Foundations of Computational Mathematics, 1-50, 2025
E. Zampa and M. Dumbser, An asymptotic-preserving and exactly mass-conservative semi-implicit scheme for weakly compressible flows based on compatible finite elements, Journal of Computational Physics 521, 113551, 2025
E. Zampa, S. Busto and M. Dumbser, A divergence-free hybrid finite volume/finite element scheme for the incompressible MHD equations based on compatible finite element spaces with a posteriori limiting, Applied Numerical Mathematics 198, 346-374, 2024
F. Fambri, E. Zampa et al., A well-balanced and exactly divergence-free staggered semi-implicit hybrid finite volume/finite element scheme for the incompressible MHD equations, Journal of Computational Physics 493, 112493, 2023
E. Zampa, A. Alonso and F. Rapetti, Using the FES framework to derive new physical degrees of freedom for finite element spaces of differential forms, Advances in Computational Mathematics 49 (2), 17, 2023
L. Bruni Burno, E.Zampa, Unisolvent and minimal physical degrees of freedom for the second family of polynomial differential forms, ESAIM: Mathematical Modelling and Numerical Analysis 56 (6), 2239-2253, 2022
Preprints:
R. Abgrall, M. Dumbser, P.-H. Maire and E. Zampa, On structure-preserving and pointwise conservative continuous DG schemes for hyperbolic systems, arXiv:2605.07576
L.B. da Veiga, S. Gómez, I. Perugia and E. Zampa, Robust H (curl)-based finite element methods for the incompressible MHD system, arXiv:2604.05717
M. Ferrari, I. Perugia and E.Zampa, Stability, convergence, and geometric properties of second-order-in-time space-time discretizations for linear and semilinear wave equations, arXiv:2601.03160
A. Stern and E.Zampa, Finite element exterior calculus for time-dependent Hamiltonian partial differential equations, arXiv:2601.00103
W.M. Boon, R. Hiptmair, W. Tonnon and E. Zampa, H (curl)-based approximation of the Stokes problem with slip boundary conditions, arXiv:2407.13353