Title :
The GPS equations and the Problem of Apollonius
Author_Institution :
Lucent Technol. Bell Lab., Naperville, IL, USA
fDate :
7/1/1996 12:00:00 AM
Abstract :
By relating the Global Positioning System (GPS) problem of location to the ancient Problem of Apollonius, this work presents a closed solution to the pseudorange positioning problem for two and three dimensions The positioning problem, given by a set of nonlinear equations, has been reduced to the solution of a quadratic equation. The resulting expressions yield either two or one physically meaningful solutions for both the two- and three-dimensional problems. Expressions for the boundary curves and surfaces that separate the one-solution domain from the two-solution domains are also given. Asymptotic lines and planes for the boundary curves and surfaces have also been derived.
Keywords :
Global Positioning System; boundary-value problems; nonlinear equations; GPS equations; Problem of Apollonius; asymptotic lines; asymptotic planes; boundary curves; closed solution; location; nonlinear equations; one-solution domain; quadratic equation; three-dimensional problems; two-dimensional problems; two-solution domains; Application software; Earth; Global Positioning System; Military computing; Nonlinear equations; Radio frequency; Satellite broadcasting; Time measurement; Timing; Vehicles;
Journal_Title :
Aerospace and Electronic Systems, IEEE Transactions on
