Pages that link to "Item:Q2088878"

The following pages link to Nonstandard finite differences numerical methods for a vegetation reaction-diffusion model (Q2088878):

Displaying 11 items.

• Numerical bifurcation analysis and pattern formation in a minimal reaction-diffusion model for vegetation (Q2115990) (← links)
• Time-accurate and highly-stable explicit peer methods for stiff differential problems (Q2685817) (← links)
• A phase- and amplification-fitted 5(4) diagonally implicit Runge-Kutta-Nyström pair for oscillatory systems (Q6100745) (← links)
• Stability analysis of ef Gaussian direct quadrature methods for Volterra integral equations (Q6101787) (← links)
• Singly TASE operators for the numerical solution of stiff differential equations by explicit Runge-Kutta schemes (Q6111339) (← links)
• Exponentially fitted methods with a local energy conservation law (Q6168053) (← links)
• Positivity-preserving and elementary stable nonstandard method for a COVID-19 SIR model (Q6556671) (← links)
• A finite volume method preserving the invariant region property for the quasimonotone reaction-diffusion systems (Q6631820) (← links)
• Stabilized explicit peer methods with parallelism across the stages for stiff problems (Q6646506) (← links)
• Stability theory of TASE-Runge-Kutta methods with inexact Jacobian (Q6649886) (← links)
• Threshold stability analysis of an unconditionally positivity-preserving numerical method for a nonlinear age-structured diffusive HIV model with spatial coefficients (Q6671832) (← links)