Discrete Maximum Principle and Energy Stability of the Compact Difference Scheme for Two-Dimensional Allen-Cahn Equation
Yu Bo, Dan Tian, Xiao Liu, Yuanfeng Jin
Abstract
The Allen-Cahn model is discussed mainly in the phase field simulation. The compact difference method will be used to numerically approximate the two-dimensional nonlinear Allen-Cahn equation with initial and boundary value conditions, and then, a fully discrete compact difference scheme with second-order accuracy in time and fourth-order in space is established. And its numerical solution satisfies the discrete maximum principle under the constraints of reasonable space and time steps. On this basis, the energy stability of the scheme is investigated. Finally, numerical examples are given to illustrate the theoretical results.
Topics & Concepts
Allen–Cahn equationMathematicsMathematical analysisStability (learning theory)Space (punctuation)Energy (signal processing)Nonlinear systemBasis (linear algebra)Scheme (mathematics)Boundary value problemBoundary (topology)Field (mathematics)Applied mathematicsPhysicsGeometryComputer scienceQuantum mechanicsOperating systemPure mathematicsMachine learningStatisticsSolidification and crystal growth phenomenaAluminum Alloy Microstructure PropertiesDifferential Equations and Numerical Methods