Theory and Practice of Hierarchical Data-driven Descent for Optimal Deformation Estimation

摘要

Real-world surfaces such as clothing, water and human body deform in complex ways. Estimating deformation parameters accurately and reliably is hard due to its high-dimensional and non-convex nature. Optimization-based approaches require good initialization while regression-based approaches need a large amount of training data. Recently, to achieve globally optimal estimation, data-driven descent (Tian and Narasimhan in Int J Comput Vis , 98:279–302, 2012) applies nearest neighbor estimators trained on a particular distribution of training samples to obtain a globally optimal and dense deformation field between a template and a distorted image. In this work, we develop a hierarchical structure that first applies nearest neighbor estimators on the entire image iteratively to obtain a rough estimation, and then applies estimators with local image support to refine the estimation. Compared to its non-hierarchical version, our approach has the theoretical guarantees with significantly fewer training samples, is faster by several orders, provides a better metric deciding whether a given image requires more (or fewer) samples, and can handle more complex scenes that include a mixture of global motion and local deformation. We demonstrate in both simulation and real experiments that the proposed algorithm successfully tracks a broad range of non-rigid scenes including water, clothing, and medical images, and compares favorably against several other deformation estimation and tracking approaches that do not provide optimality guarantees.