Multivariate change estimation for a stochastic heat equation from local measurements

Abstract

We study a stochastic heat equation with piecewise constant diffusivity θ having a jump at a hypersurface that splits the underlying space [0,1]d, d≥2, into two disjoint sets -+. Based on multiple spatially localized measurement observations on a regular δ-grid of [0,1]d, we propose a joint M-estimator for the diffusivity values and the set + that is inspired by statistical image reconstruction methods. We study convergence of the domain estimator + in the vanishing resolution level regime δ 0 and with respect to the expected symmetric difference pseudometric. As a first main finding we give a characterization of the convergence rate for + in terms of the complexity of measured by the number of intersecting hypercubes from the regular δ-grid. Furthermore, for the special case of domains + that are built from hypercubes from the δ-grid, we demonstrate that perfect identification with overwhelming probability is possible with a slight modification of the estimation approach. Implications of our general results are discussed under two specific structural assumptions on +. For a β-H\"older smooth boundary fragment , the set + is estimated with rate δβ. If we assume + to be convex, we obtain a δ-rate. While our approach only aims at optimal domain estimation rates, we also demonstrate consistency of our diffusivity estimators, which is strengthened to a CLT at minimax optimal rate for sets + anchored on the δ-grid.