Cecilia Pagliantini

According to our database1, Cecilia Pagliantini authored at least 17 papers between 2020 and 2025.

Collaborative distances:
  • Dijkstra number2 of five.
  • Erdős number3 of four.

Timeline

Legend:

Book 
In proceedings 
Article 
PhD thesis 
Dataset
Other 

Links

On csauthors.net:

Bibliography

2025
Adaptive hyper-reduction of non-sparse operators: application to parametric particle-based kinetic plasma models.
CoRR, April, 2025

Fully Adaptive Structure-Preserving Hyper-reduction of Parametric Hamiltonian Systems.
SIAM J. Sci. Comput., 2025

Dynamical Approximation and Sensor Placement for Filtering Problems.
SIAM J. Sci. Comput., 2025

An Adaptive Hierarchical Ensemble Kalman Filter with Reduced Basis Models.
SIAM/ASA J. Uncertain. Quantification, 2025

2024
Geometric low-rank approximation of the Zeitlin model of incompressible fluids on the sphere.
CoRR, 2024

Conformal variational discretisation of infinite dimensional Hamiltonian systems with gradient flow dissipation.
CoRR, 2024

2023
Gradient-Preserving Hyper-Reduction of Nonlinear Dynamical Systems via Discrete Empirical Interpolation.
SIAM J. Sci. Comput., October, 2023

Adaptive symplectic model order reduction of parametric particle-based Vlasov-Poisson equation.
Math. Comput., October, 2023

Physics-based adaptivity of a spectral method for the Vlasov-Poisson equations based on the asymmetrically-weighted Hermite expansion in velocity space.
J. Comput. Phys., September, 2023

Energy-conserving explicit and implicit time integration methods for the multi-dimensional Hermite-DG discretization of the Vlasov-Maxwell equations.
Comput. Phys. Commun., 2023

2022
Reduced basis methods for time-dependent problems.
Acta Numer., May, 2022

A Reduced Basis Ensemble Kalman Method.
CoRR, 2022

2021
Dynamical reduced basis methods for Hamiltonian systems.
Numerische Mathematik, 2021

Structure-preserving reduced basis methods for Poisson systems.
Math. Comput., 2021

The multi-dimensional Hermite-discontinuous Galerkin method for the Vlasov-Maxwell equations.
Comput. Phys. Commun., 2021

Structure-preserving model order reduction of Hamiltonian systems.
CoRR, 2021

2020
Rank-adaptive structure-preserving reduced basis methods for Hamiltonian systems.
CoRR, 2020


  Loading...