Global positioning: The uniqueness question and a new solution method

Mireille Boutin, Gregor Kemper

Research output: Contribution to journalArticlepeer-review

Abstract

We provide a new algebraic solution procedure for the global positioning problem in n dimensions using m satellites. We also give a geometric characterization of the situations in which the problem does not have a unique solution. This characterization shows that such cases can happen in any dimension and with any number of satellites, leading to counterexamples to some open conjectures. We fill a gap in the literature by giving a proof for the long-held belief that when m≥n+2, the solution is unique for almost all user positions. Even better, when m≥2n+2, almost all satellite configurations will guarantee a unique solution for all user positions. Our uniqueness results provide a basis for predicting the behavior of numerical solutions, as ill-conditioning is expected near the threshold between areas of nonuniqueness and uniqueness. Some of our results are obtained using tools from algebraic geometry.

Original languageEnglish
Article number102741
JournalAdvances in Applied Mathematics
Volume160
DOIs
StatePublished - Sep 2024

Keywords

  • Global positioning problem
  • GPS
  • Multilateration
  • Pseudoranges
  • Quadrics of revolution
  • TDOA
  • TOA

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