For Hamiltonian systems, simulation algorithms that exactly conserve numerical energy or pseudo-energy have seen extensive investigation. Most available methods either require the iterative solution of nonlinear algebraic equations at each time step, or are explicit, but where the exact conservation property depends on the exact evaluation of an integral in continuous time. Under further restrictions, namely that the potential energy contribution to the Hamiltonian is non-negative, newer techniques based on invariant energy quadratisation allow for exact numerical energy conservation and yield linearly implicit updates, requiring only the solution of a linear system at each time step. In this article, it is shown that, for a general class o...
One main issue, when numerically integrating autonomous Hamiltonian systems, is the long-term conser...
International audienceThis paper considers a general class of nonlinear systems, "nonlinear Hamilton...
In long-time numerical integration of Hamiltonian systems, and especially in molecular dynamics simu...
For Hamiltonian systems, simulation algorithms that exactly conserve numerical energy or pseudo-ener...
In this paper, we further develop recent results in the numerical solution of Hamiltonian partial di...
In this paper, we further develop recent results in the numerical solution of Hamiltonian partial di...
In this paper, we study recent results in the numerical solution of Hamiltonian partial differential...
Numerical integration methods for Hamiltonian systems are of importance across many disciplines, inc...
In this paper we show that energy conserving methods, in particular those in the class of Hamiltonia...
We introduce a family of fourth-order two-step methods that preserve the energy function of canonica...
Recent observations [5] indicate that energy-momentum methods might be better suited for the numeric...
In long-time numerical integration of Hamiltonian systems, and especially in molecular dynamics simu...
Recently, a new family of integrators (Hamiltonian Boundary Value Methods) has been introduced, whi...
One main issue, when numerically integrating autonomous Hamiltonian systems, is the long-term conser...
The numerical solution of conservative problems, i.e., problems characterized by the presence of con...
One main issue, when numerically integrating autonomous Hamiltonian systems, is the long-term conser...
International audienceThis paper considers a general class of nonlinear systems, "nonlinear Hamilton...
In long-time numerical integration of Hamiltonian systems, and especially in molecular dynamics simu...
For Hamiltonian systems, simulation algorithms that exactly conserve numerical energy or pseudo-ener...
In this paper, we further develop recent results in the numerical solution of Hamiltonian partial di...
In this paper, we further develop recent results in the numerical solution of Hamiltonian partial di...
In this paper, we study recent results in the numerical solution of Hamiltonian partial differential...
Numerical integration methods for Hamiltonian systems are of importance across many disciplines, inc...
In this paper we show that energy conserving methods, in particular those in the class of Hamiltonia...
We introduce a family of fourth-order two-step methods that preserve the energy function of canonica...
Recent observations [5] indicate that energy-momentum methods might be better suited for the numeric...
In long-time numerical integration of Hamiltonian systems, and especially in molecular dynamics simu...
Recently, a new family of integrators (Hamiltonian Boundary Value Methods) has been introduced, whi...
One main issue, when numerically integrating autonomous Hamiltonian systems, is the long-term conser...
The numerical solution of conservative problems, i.e., problems characterized by the presence of con...
One main issue, when numerically integrating autonomous Hamiltonian systems, is the long-term conser...
International audienceThis paper considers a general class of nonlinear systems, "nonlinear Hamilton...
In long-time numerical integration of Hamiltonian systems, and especially in molecular dynamics simu...