Add to ORKGWe present a family of multistep integrators based on the Adams--Bashforth methods. These schemes can be constructed for arbitrary convergence order with arbitrary step size variation. The step size can differ between different subdomains of the system. It can also change with time within a given subdomain. The methods are linearly conservative, preserving a wide class of analytically constant quantities to numerical roundoff, even when numerical truncation error is significantly higher. These methods are intended for use in solving conservative PDEs in discontinuous Galerkin formulations or in finite-difference methods with compact stencils. A numerical test demonstrates these properties and shows that significant speed improvements over t...
Time integration schemes with a fixed time step, much smaller than the dominant slow time scales of ...
AbstractTime integration schemes with a fixed time step, much smaller than the dominant slow time sc...
For large systems of ordinary differential equations (ODEs), some components may show a more active ...
We present a family of multistep integrators based on the Adams--Bashforth methods. These schemes ca...
This paper constructs multirate linear multistep time discretizations based on Adams-Bashforth metho...
The method of lines approach to the numerical solution of transient hyperbolic partial differential ...
Semi-discrete Galerkin formulations of transient wave equations, either with conforming or discontin...
International audienceThe discontinuous Galerkin time-stepping method has many advantageous properti...
The discontinuous Galerkin time-stepping method has many advantageous properties for solving parabol...
This paper presents a numerical scheme of arbitrary order of accuracy in both space and time, based ...
This paper presents a numerical scheme of arbitrary order of accuracy in both space and time, based ...
This paper presents a numerical scheme of arbitrary order of accuracy in both space and time, based ...
A new method for the acceleration of linear and nonlinear time dependent calculations is presented. ...
Multi-stage time-stepping schemes, tailored to chosen spatial-differencing operators, are derived an...
Time integration schemes with a fixed time step, much smaller than the dominant slow time scales of ...
Time integration schemes with a fixed time step, much smaller than the dominant slow time scales of ...
AbstractTime integration schemes with a fixed time step, much smaller than the dominant slow time sc...
For large systems of ordinary differential equations (ODEs), some components may show a more active ...
We present a family of multistep integrators based on the Adams--Bashforth methods. These schemes ca...
This paper constructs multirate linear multistep time discretizations based on Adams-Bashforth metho...
The method of lines approach to the numerical solution of transient hyperbolic partial differential ...
Semi-discrete Galerkin formulations of transient wave equations, either with conforming or discontin...
International audienceThe discontinuous Galerkin time-stepping method has many advantageous properti...
The discontinuous Galerkin time-stepping method has many advantageous properties for solving parabol...
This paper presents a numerical scheme of arbitrary order of accuracy in both space and time, based ...
This paper presents a numerical scheme of arbitrary order of accuracy in both space and time, based ...
This paper presents a numerical scheme of arbitrary order of accuracy in both space and time, based ...
A new method for the acceleration of linear and nonlinear time dependent calculations is presented. ...
Multi-stage time-stepping schemes, tailored to chosen spatial-differencing operators, are derived an...
Time integration schemes with a fixed time step, much smaller than the dominant slow time scales of ...
Time integration schemes with a fixed time step, much smaller than the dominant slow time scales of ...
AbstractTime integration schemes with a fixed time step, much smaller than the dominant slow time sc...
For large systems of ordinary differential equations (ODEs), some components may show a more active ...