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Choice of Finite-Difference Schemes in Solving Coefficient Inverse Problems

A. F. Albu, Yu. G. Evtushenko, V. I. Zubov

2020Computational Mathematics and Mathematical Physics11 citationsDOI

Abstract

Abstract Various choices of a finite-difference scheme for approximating the heat diffusion equation in solving a three-dimensional coefficient inverse problem were studied. A comparative analysis was conducted for several alternating direction schemes, such as locally one-dimensional, Douglas–Rachford, and Peaceman–Rachford schemes, as applied to nonlinear problems for the three-dimensional heat equation with temperature-dependent coefficients. Each numerical method was used to compute the temperature distribution inside a parallelepiped. The methods were compared in terms of the accuracy of the resulting solution and the computation time required for achieving the prescribed accuracy on a computer.

Topics & Concepts

MathematicsFinite differenceInverse problemFinite difference methodInverseApplied mathematicsMathematical analysisFinite difference coefficientFinite difference schemeCalculus (dental)Finite element methodGeometryMixed finite element methodThermodynamicsMedicineDentistryPhysicsDifferential Equations and Numerical MethodsDifferential Equations and Boundary ProblemsNumerical methods in inverse problems
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