A revisit to DeTurck method on curve shortening flow with optimal error analysis

Abstract

The curve shortening--DeTurck flow introduced by Elliott and Fritz (IMA J. Numer. Anal. 37(2): 543--603, 2017) is a reparameterization of the curve shortening flow via the DeTurck trick. For corresponding discrete schemes, although the H1-error estimate has been established, the optimal L2-error estimate remains open due to technical difficulties. In this paper, we prove optimal L2-error estimates for linearized Euler and Crank--Nicolson discretizations combined with finite elements of degree k 1 in space. Moreover, we provide an extrinsic approach to derive the curve shortening--DeTurck flow. Numerical experiments are presented to illustrate the mesh distribution properties and to verify the convergence rates in both space and time.

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