An Adaptive Sampling Algorithm for Level-set Approximation

Abstract

We propose a new numerical scheme for approximating level-sets of Lipschitz multivariate functions which is robust to stochastic noise. The algorithm's main feature is an adaptive grid-based stochastic approximation strategy which automatically refines the approximation over regions close to the level set. This strategy combines a local function approximation method with a noise reduction scheme and produces -accurate approximations with an expected cost complexity reduction of -(p+1α p) compared to a non-adaptive scheme, where α is the convergence rate of the function approximation method and we assume that the noise can be controlled in Lp. We provide numerical experiments in support of our theoretical findings. These include 2- and 3-dimensional functions with a complex level set structure, as well as a failure region estimation problem described by a hyperelasticity partial differential equation with random field coefficients.