Litcius/Paper detail

Numerical Schemes for Fractional Energy Balance Model of Climate Change with Diffusion Effects

Muhammad Shoaib Arif, Kamaleldin Abodayeh, Yasir Nawaz

2023Emerging Science Journal16 citationsDOIOpen Access PDF

Abstract

This study aims to propose numerical schemes for fractional time discretization of partial differential equations (PDEs). The scheme is comprised of two stages. Using von Neumann stability analysis, we ensure the robustness of the scheme. The energy balance model for climate change is modified by adding source terms. The local stability analysis of the model is presented. Also, the fractional model in the form of PDEs with the effect of diffusion is given and solved by applying the proposed scheme. The proposed scheme is compared with the existing scheme, which shows a faster convergence of the presented scheme than the existing one. The effects of feedback, deep ocean heat uptake, and heat source parameters on global mean surface and deep ocean temperatures are displayed in graphs. The current study is cemented by the fact-based popular approximations of the surveys and modeling techniques, which have been the focus of several researchers for thousands of years.Mathematics Subject Classification:65P99, 86Axx, 35Fxx. Doi: 10.28991/ESJ-2023-07-03-011 Full Text: PDF

Topics & Concepts

DiscretizationStability (learning theory)Partial differential equationConvergence (economics)Robustness (evolution)Energy balanceApplied mathematicsScheme (mathematics)Heat equationMathematicsMathematical optimizationComputer scienceMathematical analysisEconomicsChemistryBiologyMachine learningBiochemistryGeneEconomic growthEcologyDifferential Equations and Numerical MethodsFractional Differential Equations SolutionsNumerical methods for differential equations
Numerical Schemes for Fractional Energy Balance Model of Climate Change with Diffusion Effects | Litcius