Estimating perimeter using graph cuts

Abstract

We investigate the estimation of the perimeter of a set by a graph cut of a random geometric graph. For ⊂ D = (0,1)d, with d ≥ 2, we are given n random i.i.d. points on D whose membership in is known. We consider the sample as a random geometric graph with connection distance >0. We estimate the perimeter of (relative to D) by the, appropriately rescaled, graph cut between the vertices in and the vertices in D . We obtain bias and variance estimates on the error, which are optimal in scaling with respect to n and . We consider two scaling regimes: the dense (when the average degree of the vertices goes to ∞) and the sparse one (when the degree goes to 0). In the dense regime there is a crossover in the nature of approximation at dimension d=5: we show that in low dimensions d=2,3,4 one can obtain confidence intervals for the approximation error, while in higher dimensions one can only obtain error estimates for testing the hypothesis that the perimeter is less than a given number.