Efficient Linear Schemes with Unconditional Energy Stability for the Phase Field Model of Solid-State Dewetting Problems

Abstract: In this paper, we study linearly first and second order in time, uniquely solvable and unconditionally energy stable numerical schemes to approximate the phase field model of solid-state dewetting problems based on the novel "scalar auxiliary variable" (SAV) approach, a new developed efficient and accurate method for a large class of gradient flows. The schemes are based on the first order Euler method and the second order backward differential formulas (BDF2) for time discretization, and finite element method… Show more

A family of effective structure-preserving schemes with second-order accuracy for the undamped sine–Gordon equation

A family of effective structure-preserving schemes with second-order accuracy for the undamped sine–Gordon equation

Fast and Efficient Numerical Finite Difference Method for Multiphase Image Segmentation