Calculus of Variations and Geometric Measure Theory

T. Laux - Poiatti

De Giorgi varifold solutions to Mean Curvature Flow: a minimizing movements approach

created by poiatti on 07 Jul 2026

[BibTeX]

Preprint

Inserted: 7 jul 2026
Last Updated: 7 jul 2026

Year: 2026

ArXiv: 2607.03930 PDF
Links: Arxiv preprint

Abstract:

We propose an alternative existence proof of global weak solutions to mean curvature flow and volume preserving mean curvature flow. We prove for the first time for a minimizing movements scheme the unconditional convergence towards a varifold solution, here a De Giorgi solution. The argument is purely variational and does not rely on comparison principles. The key novelty is an alternative proxy for the completely degenerate $L^2$ distance that is more robust than the one of Almgren-Taylor-Wang and Luckhaus-Sturzenhecker.

Keywords: mean curvature flow, minimizing movements, De Giorgi interpolation