In this paper, we study recent results in the numerical solution of Hamiltonian partial differential equations (PDEs), by means of energy-conserving methods in the class of Line Integral Methods, in particular, the Runge-Kutta methods named Hamiltonian Boundary Value Methods (HBVMs). We show that the use of energy-conserving methods, able to conserve a discrete counterpart of the Hamiltonian functional (which derives from a proper space semi-discretization), confers more robustness to the numerical solution of such problems
One of the main features when dealing with Hamiltonian problems is the conservation of the energy. I...
One of the main features when dealing with Hamiltonian problems is the conservation of the energy. I...
The numerical solution of conservative problems, i.e., problems characterized by the presence of con...
In this paper, we study recent results in the numerical solution of Hamiltonian partial differential...
In this paper we show that energy conserving methods, in particular those in the class of Hamiltonia...
In this paper, we study recent results in the numerical solution of Hamiltonian partial differential...
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 report on recent findings in the numerical solution of Hamiltonian Partial Differe...
In this paper, we report on recent findings in the numerical solution of Hamiltonian Partial Differe...
The numerical solution of Hamiltonian PDEs has been the subject of many investigations in the last y...
In this paper, we report about recent findings in the numerical solution of Hamiltonian Partial Diff...
One main issue, when numerically integrating autonomous Hamiltonian systems, is the long-term conser...
One main issue, when numerically integrating autonomous Hamiltonian systems, is the long-term conser...
We provide a self-contained introduction to discrete line integral methods, a class of energy-conser...
One of the main features when dealing with Hamiltonian problems is the conservation of the energy. I...
One of the main features when dealing with Hamiltonian problems is the conservation of the energy. I...
The numerical solution of conservative problems, i.e., problems characterized by the presence of con...
In this paper, we study recent results in the numerical solution of Hamiltonian partial differential...
In this paper we show that energy conserving methods, in particular those in the class of Hamiltonia...
In this paper, we study recent results in the numerical solution of Hamiltonian partial differential...
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 report on recent findings in the numerical solution of Hamiltonian Partial Differe...
In this paper, we report on recent findings in the numerical solution of Hamiltonian Partial Differe...
The numerical solution of Hamiltonian PDEs has been the subject of many investigations in the last y...
In this paper, we report about recent findings in the numerical solution of Hamiltonian Partial Diff...
One main issue, when numerically integrating autonomous Hamiltonian systems, is the long-term conser...
One main issue, when numerically integrating autonomous Hamiltonian systems, is the long-term conser...
We provide a self-contained introduction to discrete line integral methods, a class of energy-conser...
One of the main features when dealing with Hamiltonian problems is the conservation of the energy. I...
One of the main features when dealing with Hamiltonian problems is the conservation of the energy. I...
The numerical solution of conservative problems, i.e., problems characterized by the presence of con...