Quantitative conditions of rectifiability for varifolds

Abstract

Our purpose is to state quantitative conditions ensuring the rectifiability of a d--varifold V obtained as the limit of a sequence of d--varifolds (Vi)i which need not to be rectifiable. More specifically, we introduce a sequence Ei i of functionals defined on d--varifolds, such that if i Ei (Vi) < +∞ and Vi satisfies a uniform density estimate at some scale βi, then V = i Vi is d--rectifiable. The main motivation of this work is to set up a theoretical framework where curves, surfaces, or even more general d--rectifiable sets minimizing geometrical functionals (like the length for curves or the area for surfaces), can be approximated by "discrete" objects (volumetric approximations, pixelizations, point clouds etc.) minimizing some suitable "discrete" functionals.