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A compact Fourth-Order Implicit-Explicit Runge-Kutta Type Method for Solving Diffusive Lotka–Volterra System

Younis A. Sabawi, Mardan A. Pirdawood, Mohammed I. Sadeeq

2021Journal of Physics Conference Series14 citationsDOIOpen Access PDF

Abstract

Abstract This paper aims to developed a high-order and accurate method for the solution of one-dimensional Lotka-Volterra-diffusion with Numman boundary conditions. A fourth-order compact finite difference scheme for spatial part combined with implicit-explicit Runge Kutta scheme in temporal are proposed. Furthermore, boundary points are discretized by using a compact finite difference scheme in terms of fourth order accuracy. A key idea for proposed scheme is to take full advantage of method of line (MOL), this is consequently enabling us to use implicit-explicit Runge Kutta method, that are of fourth order in time. We constructed fourth order accuracy in both space and time and is unconditionally stable. This is consequently leading to a reduction in the computational cost of the scheme. Numerical experiments show that the combination of the compact finite difference with IMEX- RK methods give an accurate and reliable for solving the Lotka-Volterra-diffusion.

Topics & Concepts

Runge–Kutta methodsCompact finite differenceDiscretizationMathematicsScheme (mathematics)Applied mathematicsSpace (punctuation)Boundary value problemOrder (exchange)Finite difference methodBoundary (topology)Finite differenceStability (learning theory)Third orderDiffusionMathematical optimizationMathematical analysisComputer scienceNumerical analysisEconomicsOperating systemTheologyFinancePhysicsPhilosophyThermodynamicsMachine learningDifferential Equations and Numerical MethodsNumerical methods for differential equationsAdvanced Numerical Methods in Computational Mathematics
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