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A compact difference method for the 2-D Kuramoto-Tsuzuki complex equation with Neumann boundary characterized by strong nonlinear effects

Jinxiu Zhang, Xuehua Yang, Song Wang

2025Computers & Mathematics with Applications7 citationsDOI

Topics & Concepts

MathematicsNonlinear systemRobustness (evolution)Compact finite differenceMathematical analysisRate of convergenceConvergence (economics)Stability (learning theory)Compact spaceEnergy methodNeumann boundary conditionVon Neumann architectureSpace (punctuation)Numerical analysisBoundary (topology)Applied mathematicsBoundary value problemNumerical stabilityScheme (mathematics)Von Neumann stability analysisEnergy (signal processing)Periodic boundary conditionsFinite difference methodEnergy functionalFluid Dynamics and Thin FilmsNumerical methods for differential equationsNonlinear Dynamics and Pattern Formation
A compact difference method for the 2-D Kuramoto-Tsuzuki complex equation with Neumann boundary characterized by strong nonlinear effects | Litcius