English

On Uniquely Registrable Networks

Networking and Internet Architecture 2019-06-25 v1 Computational Geometry

Abstract

Consider a network with NN nodes in dd-dimensional Euclidean space, and MM subsets of these nodes P1,,PMP_1,\cdots,P_M. Assume that the nodes in a given PiP_i are observed in a local coordinate system. The registration problem is to compute the coordinates of the NN nodes in a global coordinate system, given the information about P1,,PMP_1,\cdots,P_M and the corresponding local coordinates. The network is said to be uniquely registrable if the global coordinates can be computed uniquely (modulo Euclidean transforms). We formulate a necessary and sufficient condition for a network to be uniquely registrable in terms of rigidity of the body graph of the network. A particularly simple characterization of unique registrability is obtained for planar networks. Further, we show that kk-vertex-connectivity of the body graph is equivalent to quasi kk-connectivity of the bipartite correspondence graph of the network. Along with results from rigidity theory, this helps us resolve a recent conjecture due to Sanyal et al. (IEEE TSP, 2017) that quasi 33-connectivity of the correspondence graph is both necessary and sufficient for unique registrability in two dimensions. We present counterexamples demonstrating that while quasi (d+1)(d+1)-connectivity is necessary for unique registrability in any dimension, it fails to be sufficient in three and higher dimensions.

Keywords

Cite

@article{arxiv.1906.09714,
  title  = {On Uniquely Registrable Networks},
  author = {Aditya V. Singh and Kunal N. Chaudhury},
  journal= {arXiv preprint arXiv:1906.09714},
  year   = {2019}
}

Comments

10 pages, 8 figures, accepted for publication in the IEEE Transactions on Network Science and Engineering

R2 v1 2026-06-23T10:01:23.736Z