E. Hairer : Long-time energy conservation of numerical integrators
Organized by: Begonia Cano, Debra Lewis, Brynjulf Owren
A. Iserles : On an isospectral Lie-Poisson flow and numerical computation of faithful Lie-algebra representations
F. Casas: Explicit Magnus expansions for nonlinear equations
E. Celledoni: Eulerian and Semi-Lagrangian exponential integrators for convection dominated problems
A. Zanna: The Discrete Moser-Veselov algorithm for the free rigid body, Revisited
D. Lewis:Partial connections and geometric integration
B. Cano: Conserved quantities of some Hamiltonian wave equations after full discretization.
T. Bridges: Some questions about symplectic and multi-symplectic discretizations
J. Frank: Dispersion properties of conservative discretizations for wave equations
H. Munthe-Kaas: Fourier analysis on groups applied to spectral element discretizations of PDEs
B. Owren: On Geometric Integrators for the Nonlinear Schrodinger equation
A. Murua: An algebraic approach to conservation of first integrals in numerical integration
F. Legoll: Long time averaging for molecular dynamics simulations
B. Leimkuhler: New time reversible and volume preserving multiple scale integrators
A. Duran: Some results on numerical propagation when integrating Hamiltonian relative preiodic orbits
Y. Nishimori: Riemannian geometry of neural networks for unsupervised learning