Author: Pegoraro, Matteo; Beraha, Mario
Title: Projected Statistical Methods for Distributional Data on the Real Line with the Wasserstein Metric Cord-id: 7gqin9yc Document date: 2021_1_22
ID: 7gqin9yc
Snippet: We present a novel class of projected methods, to perform statistical analysis on a data set of probability distributions on the real line, with the 2-Wasserstein metric. We focus in particular on Principal Component Analysis (PCA) and regression. To define these models, we exploit a representation of the Wasserstein space closely related to its weak Riemannian structure, by mapping the data to a suitable linear space and using a metric projection operator to constrain the results in the Wassers
Document: We present a novel class of projected methods, to perform statistical analysis on a data set of probability distributions on the real line, with the 2-Wasserstein metric. We focus in particular on Principal Component Analysis (PCA) and regression. To define these models, we exploit a representation of the Wasserstein space closely related to its weak Riemannian structure, by mapping the data to a suitable linear space and using a metric projection operator to constrain the results in the Wasserstein space. By carefully choosing the tangent point, we are able to derive fast empirical methods, exploiting a constrained B-spline approximation. As a byproduct of our approach, we are also able to derive faster routines for previous work on PCA for distributions. By means of simulation studies, we compare our approaches to previously proposed methods, showing that our projected PCA has similar performance for a fraction of the computational cost and that the projected regression is extremely flexible even under misspecification. Several theoretical properties of the models are investigated and asymptotic consistency is proven. Two real world applications to Covid-19 mortality in the US and wind speed forecasting are discussed.
Search related documents:
Co phrase search for related documents- local approximation and machine learning: 1
- low dimensional and machine learning: 1, 2, 3, 4, 5, 6, 7, 8, 9, 10, 11, 12
- low dimensional space and machine learning: 1
Co phrase search for related documents, hyperlinks ordered by date