Numerical integration methods for Hamiltonian systems are of importance across many disciplines, including musical acoustics, where many systems of interest are very nearly lossless. Of particular interest are methods possessing a conserved pseu-doenergy. Though most such methods have an implicit character, an explicit method was proposed recently by Marazzato et al. The proposed method relies on a continuous integration which must be performed exactly in order for the conservation property to hold-as a result, it holds only approximately under numerical quadrature. Here, we show an explicit scheme for Hamiltonian integration, with a different choice of pseudoenergy, which is exactly conserved. Most importantly, a fast implementation is pos...
AbstractA new unconditionally stable explicit time-integration method is proposed herein, which can ...
AbstractWe present and analyze energy-conserving methods for the numerical integration of IVPs of Po...
Modulated Fourier expansion is used to show long-time near-conservation of the total and oscillatory...
Numerical integration methods for Hamiltonian systems are of importance across many disciplines, inc...
For Hamiltonian systems, simulation algorithms that exactly conserve numerical energy or pseudo-ener...
For Hamiltonian systems, simulation algorithms that exactly conserve numerical energy or pseudo-ener...
International audienceThis paper considers a general class of nonlinear systems, "nonlinear Hamilton...
At the example of Hamiltonian differential equations, geometric properties of the flow are discussed...
Energy preserving schemes for nonlinear Hamiltonian systems of wave equations: Application to the vi...
The dynamics of elastic solids and structures defines classical Hamiltonian systems with a very rich...
A method of choice for the long-time integration of constrained Hamiltonian systems is the Rattle al...
International audienceWe propose a new explicit pseudo-energy and momentum conserving scheme for the...
The problem of the vibration of a string is well known in its linear form, describing the transversa...
At the example of Hamiltonian differential equations, geometric properties of the flow are discussed...
For Hamiltonian systems with non-canonical structure matrix a new class of numerical integrators is ...
AbstractA new unconditionally stable explicit time-integration method is proposed herein, which can ...
AbstractWe present and analyze energy-conserving methods for the numerical integration of IVPs of Po...
Modulated Fourier expansion is used to show long-time near-conservation of the total and oscillatory...
Numerical integration methods for Hamiltonian systems are of importance across many disciplines, inc...
For Hamiltonian systems, simulation algorithms that exactly conserve numerical energy or pseudo-ener...
For Hamiltonian systems, simulation algorithms that exactly conserve numerical energy or pseudo-ener...
International audienceThis paper considers a general class of nonlinear systems, "nonlinear Hamilton...
At the example of Hamiltonian differential equations, geometric properties of the flow are discussed...
Energy preserving schemes for nonlinear Hamiltonian systems of wave equations: Application to the vi...
The dynamics of elastic solids and structures defines classical Hamiltonian systems with a very rich...
A method of choice for the long-time integration of constrained Hamiltonian systems is the Rattle al...
International audienceWe propose a new explicit pseudo-energy and momentum conserving scheme for the...
The problem of the vibration of a string is well known in its linear form, describing the transversa...
At the example of Hamiltonian differential equations, geometric properties of the flow are discussed...
For Hamiltonian systems with non-canonical structure matrix a new class of numerical integrators is ...
AbstractA new unconditionally stable explicit time-integration method is proposed herein, which can ...
AbstractWe present and analyze energy-conserving methods for the numerical integration of IVPs of Po...
Modulated Fourier expansion is used to show long-time near-conservation of the total and oscillatory...