A note on Global Positioning System (GPS) and Euclidean distance matrices
Abstract
Let D be an n × n Euclidean distance matrix (EDM) with embedding dimension r; and let d ∈ Rn be a given vector. In this note, we consider the problem of finding a vector y ∈ Rn, that is closest to d in Euclidean norm, such that the augmented matrix [ arraycc 0 & yT \\ y & D array] is itself an EDM of embedding dimension r. This problem is motivated by applications in Global Positioning System (GPS). We present a fault detection criterion and three algorithms: one for the case n=4, and two for the case n ≥ 5.
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