Maximal regularity of backward difference time discretization for evolving surface PDEs and its application to nonlinear problems

Abstract: Maximal parabolic $L^p$-regularity of linear parabolic equations on an evolving surface is shown by pulling back the problem to the initial surface and studying the maximal $L^p$-regularity on a fixed surface. By freezing the coefficients in the parabolic equations at a fixed time and utilizing a perturbation argument around the freezed time, it is shown that backward difference time discretizations of linear parabolic equations on an evolving surface along characteristic trajectories can preserve maximal $L^p… Show more

Numerical analysis for the interaction of mean curvature flow and diffusion on closed surfaces

Numerical analysis for the interaction of mean curvature flow and diffusion on closed surfaces