Abstract
AbstractThe author investigates least squares as a method for fitting small‐circle models to a sample of unit vectors in R3. He highlights a local linear model underlying the estimation of the parameters of a circle. This model is used to construct an estimation algorithm and regression‐type inference procedures for the parameters of a circle. It makes it possible to compare the fit of a small circle with that of a spherical ellipse. The limitations of the least‐squares approach are emphasized: when the errors are bounded away from 0, the least‐squares estimators are not consistent as the sample size goes to infinity. Two examples, concerned with the migration of elephant seals and with the classification of geological folds, are analyzed using the linear model techniques proposed in this work.
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