Advanced Structure Preserving Lagrangian schemes for novel first order Hyperbolic Models: towards General Relativistic Astrophysics

ERC (European Research Council)HORIZON-ERCID: 101114995
EC Contribution
€15,000
Consortium Size
1 orgs
Start Year
2024
Summary

ALcHyMiA will make substantial progress in applied mathematics, targeting long-time stable and self-consistent simulations in general relativity and high energy density problems, via the development of new and effective structure preserving numerical methods with provable mathematical properties. We will devise innovative schemes for hyperbolic partial differential equations (PDE) which at the discrete level exactly preserve all the invariants of the continuous problem, such as equilibria, involutions and asymptotic limits. Next to fluids and magnetohydrodynamics, key for benchmarks and valuable applications on Earth, we target a new class of first order hyperbolic systems that unifies fluid and solid mechanics and gravity theory. This allows to study gravitational waves, binary neutron stars and accretion disks around black holes that require the coupled evolution of matter and spacetime. Here, high resolution and minimal dissipation at shocks and moving interfaces are crucial and will be achieved by groundbreaking direct Arbitrary-Lagrangian-Eulerian (ALE) methods on moving Voronoi meshes with changing topology. These are necessary to maintain optimal grid quality even when following rotating compact objects, complex shear flows or metric torsion. They also ensure rotational invariance, entropy stability and Galilean invariance in the Newtonian limit. The breakthrough of our new Finite Volume and Discontinuous Galerkin ALE schemes lies in the geometrical understanding and high order PDE integration over 4D spacetime manifolds. The high-risk high-gain challenge is the design of smart DG schemes with virtual, bound-preserving, genuinely nonlinear data-dependent function spaces, taking advantage of the Voronoi properties. Finally, it is an explicit mission of ALcHyMiA to grow a solid scientific community, sharing know-how by tailored dissemination activities from top-level schools to carefully organized international events revolving around personalized interactions.

Consortium (1)

Project Results (6)

Source: CORDIS, the EU research results database.

Publications (5)
On general and complete multidimensional Riemann solvers for nonlinear systems of hyperbolic conservation laws
Computers & Fluids· 2026DOI
Elena Gaburro, Mario Ricchiuto, Michael Dumbser
High order well-balanced Arbitrary-Lagrangian-Eulerian ADER discontinuous Galerkin schemes on general polygonal moving meshes
Computers & Fluids· 2025DOI
Elena Gaburro
A well-balanced discontinuous Galerkin method for the first–order Z4 formulation of the Einstein–Euler system
Journal of Computational Physics· 2024DOI
Michael Dumbser, Olindo Zanotti, Elena Gaburro, Ilya Peshkov
Discontinuous Galerkin schemes for hyperbolic systems in non-conservative variables: Quasi-conservative formulation with subcell finite volume corrections
Computer Methods in Applied Mechanics and Engineering· 2024DOI
Elena Gaburro, Walter Boscheri, Simone Chiocchetti, Mario Ricchiuto
Very high order treatment of embedded curved boundaries in compressible flows: ADER discontinuous Galerkin with a space-time Reconstruction for Off-site data
Computers & Mathematics with Applications· 2024DOI
Ciallella, Mirco; Clain, Stephane; Gaburro, Elena; Ricchiuto, Mario
Deliverables (1)
Data Management Plan