Computational p-Willmore Flow with Conformal Penalty
Abstract
The unsigned p-Willmore functional introduced in \cite{mondino2011} generalizes important geometric functionals which measure the area and Willmore energy of immersed surfaces. Presently, techniques from \cite{dziuk2008} are adapted to compute the first variation of this functional as a weak-form system of equations, which are subsequently used to develop a model for the p-Willmore flow of closed surfaces in . This model is amenable to constraints on surface area and enclosed volume, and is shown to decrease the p-Willmore energy monotonically over time. In addition, a penalty-based regularization procedure is formulated to prevent artificial mesh degeneration along the flow; inspired by a conformality condition derived in \cite{kamberov1996}, this procedure encourages angle-preservation in a closed and oriented surface immersion as it evolves. Following this, a finite-element discretization of both systems is discussed, and an application to mesh editing is presented.
Cite
@article{arxiv.1907.09532,
title = {Computational p-Willmore Flow with Conformal Penalty},
author = {Anthony Gruber and Eugenio Aulisa},
journal= {arXiv preprint arXiv:1907.09532},
year = {2021}
}
Comments
Accepted 6/2020 to ACM Trans. Graph