Torus Probabilistic Principal Component Analysis

08/24/2020
by   Anahita Nodehi, et al.
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One of the most common problems that any technique encounters is the high dimensionality of the input data. This yields several problems in the subsequently statistical methods due to so called "curse of dimensionality". Several dimension reduction methods have been proposed in the literature, until now, to accomplish the goal of having smaller dimension space. The most popular among them, is the so called Principal Component Analysis (PCA). One of the extensions of PCA is Probabilistic PCA (known as PPCA). In PPCA, a probabilistic model is used to perform the dimension reduction. By convention, there are cases in applied sciences, e.g. Bioinformatics, Biology and Geology that the data at hand are in non Euclidean space. Elaborating further, an important situation is when each variable poses a direction so that a data point is lying on a torus. According to its importance, the extension of the PCA to such data is being under attention during last decades. In this paper, we introduce a Probabilistic PCA for data on torus (TPPCA), assuming a Multivariate Wrapped Normal distribution as the underline model. Furthermore, we present certain appropriate algorithms to compute this dimension reduction technique and then, we compare our proposal with other dimension reduction techniques using examples based on real datasets and a small Monte Carlo simulation.

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