English

A Graph Framework for Manifold-valued Data

Numerical Analysis 2018-12-10 v2

Abstract

Graph-based methods have been proposed as a unified framework for discrete calculus of local and nonlocal image processing methods in the recent years. In order to translate variational models and partial differential equations to a graph, certain operators have been investigated and successfully applied to real-world applications involving graph models. So far the graph framework has been limited to real- and vector-valued functions on Euclidean domains. In this paper we generalize this model to the case of manifold-valued data. We introduce the basic calculus needed to formulate variational models and partial differential equations for manifold-valued functions and discuss the proposed graph framework for two particular families of operators, namely, the isotropic and anisotropic graph~pp-Laplacian operators, p1p\geq1. Based on the choice of pp we are in particular able to solve optimization problems on manifold-valued functions involving total variation (p=1p=1) and Tikhonov (p=2p=2) regularization. Finally, we present numerical results from processing both synthetic as well as real-world manifold-valued data, e.g., from diffusion tensor imaging (DTI) and light detection and ranging (LiDAR) data.

Keywords

Cite

@article{arxiv.1702.05293,
  title  = {A Graph Framework for Manifold-valued Data},
  author = {Ronny Bergmann and Daniel Tenbrinck},
  journal= {arXiv preprint arXiv:1702.05293},
  year   = {2018}
}
R2 v1 2026-06-22T18:21:05.155Z