JSM 2021 Online Program

Directional data consist of observations distributed on a hypersphere, and appear in many applied fields, such as astronomy, ecology, and environmental science. We discuss both statistical and computational problems of kernel smoothing for directional data. We derive the statistical convergence rates of directional KDE and its derivatives and examine the problem of mode estimation. Given that the classical mean shift algorithm can be generalized to directional data, we also study the algorithmic convergence rate of the directional mean shift algorithm by viewing it as a gradient ascent method on the unit hypersphere. To demonstrate the applicability of our proposed algorithm, we evaluate it as a mode clustering method on both simulated and real-world datasets.