Stability and convergence analysis of reduced-order finite difference schemes for a class of nonlinear time-fractional partial differential equations
Key Points
Stability and convergence are crucial for ensuring accurate reduction of complex models.
Significant improvements in scheme efficiency were observed through numerical methods applied to equations.
Reduced-order finite difference schemes optimize computational cost while maintaining accuracy.
Insights from this analysis may enable broader application of numerical techniques in real-world problems.
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Stability and convergence analysis of reduced-order finite difference schemes for a class of nonlinear time-fractional partial differential equations | Synapse