Testing surface area with arbitrary accuracy

Abstract

Recently, Kothari et al.\ gave an algorithm for testing the surface area of an arbitrary set A ⊂ [0, 1]n. Specifically, they gave a randomized algorithm such that if A's surface area is less than S then the algorithm will accept with high probability, and if the algorithm accepts with high probability then there is some perturbation of A with surface area at most n S. Here, n is a dimension-dependent constant which is strictly larger than 1 if n 2, and grows to 4/π as n ∞. We give an improved analysis of Kothari et al.'s algorithm. In doing so, we replace the constant n with 1 + η for η > 0 arbitrary. We also extend the algorithm to more general measures on Riemannian manifolds.