Given a collection of points S⊂RN, which is partitioned into M overlapping subsets {Si}i=1M, and approximate data {Di}i=1M associated with the subsets, one may seek a consistent merged dataset D that is derived from {Si}i=1M and {Di}i=1M. This note presents a method for constructing D under the assumption that D represents discrete samples of a suitably smooth function f:RN→R evaluated at the points in S. The method has two steps. The first step uses a least-squares solve to approximate the constant offsets for each Di. The second step uses a sequence of discrete Dirichlet problems to resolve any remaining differences. We include a two dimensional example of this method applied to deformation measurements derived from Interferometric Synthetic Aperture Radar (InSAR).
@article{arxiv.2405.06838,
title = {Merging Point Data for InSAR Deformation Processing},
author = {Matthew T. Calef and Kelly M. Olsen and Piyush S. Agram},
journal= {arXiv preprint arXiv:2405.06838},
year = {2024}
}