Although most adaptive software for initial value problems is designed with an accuracy requirement—control of the local error—it is frequently observed that stability is imparted by the adaptation. This relationship between local error control and numerical stability is given a firm theoretical underpinning. The dynamics of numerical methods with local error control are studied for three classes of ordinary differential equations: dissipative, contractive, and gradient systems. Dissipative dynamical systems are characterised by having a bounded absorbing set B which all trajectories eventually enter and remain inside. The exponentially contractive problems studied have a unique, globally exponentially attracting equilibrium point and th...
The numerical approximation of dissipative initial value problems by fixed time-stepping Runge–Kutta...
The critical dynamics of a spatially inhomogeneous system are analyzed with allowance for local none...
AbstractCodes for the solution of the initial value problem for a system of ordinary differential eq...
Although most adaptive software for initial value problems is designed with an accuracy requirement—...
. Positive results are obtained about the effect of local error control in numerical simulations of ...
Positive results are obtained about the effect of local error control in numerical simulations of or...
Positive results are obtained about the effect of local error control in numerical simulations of or...
Positive results are obtained about the effect of local error control in numerical simulations of or...
Positive results are obtained about the effect of local error control in numerical simulations of or...
In the numerical solution of initial value ordinary differential equations, to what extent does loca...
In the numerical solution of initial value ordinary differential equations, to what extent does loca...
In the numerical solution of initial value ordinary differential equations, to what extent does loca...
AbstractCodes for the solution of the initial value problem for a system of ordinary differential eq...
The numerical approximation of dissipative initial value problems by fixed time-stepping Runge–Kutta...
The numerical approximation of dissipative initial value problems by fixed time-stepping Runge–Kutta...
The numerical approximation of dissipative initial value problems by fixed time-stepping Runge–Kutta...
The critical dynamics of a spatially inhomogeneous system are analyzed with allowance for local none...
AbstractCodes for the solution of the initial value problem for a system of ordinary differential eq...
Although most adaptive software for initial value problems is designed with an accuracy requirement—...
. Positive results are obtained about the effect of local error control in numerical simulations of ...
Positive results are obtained about the effect of local error control in numerical simulations of or...
Positive results are obtained about the effect of local error control in numerical simulations of or...
Positive results are obtained about the effect of local error control in numerical simulations of or...
Positive results are obtained about the effect of local error control in numerical simulations of or...
In the numerical solution of initial value ordinary differential equations, to what extent does loca...
In the numerical solution of initial value ordinary differential equations, to what extent does loca...
In the numerical solution of initial value ordinary differential equations, to what extent does loca...
AbstractCodes for the solution of the initial value problem for a system of ordinary differential eq...
The numerical approximation of dissipative initial value problems by fixed time-stepping Runge–Kutta...
The numerical approximation of dissipative initial value problems by fixed time-stepping Runge–Kutta...
The numerical approximation of dissipative initial value problems by fixed time-stepping Runge–Kutta...
The critical dynamics of a spatially inhomogeneous system are analyzed with allowance for local none...
AbstractCodes for the solution of the initial value problem for a system of ordinary differential eq...