Fast Function to Function Regression - Robotics Institute Carnegie Mellon University

Fast Function to Function Regression

J. Oliva, W. Neiswanger, B. Poczos, E. Xing, and J. Schneider
Conference Paper, Proceedings of 18th International Conference on Artificial Intelligence and Statistics (AISTATS '15), Vol. 38, pp. 717 - 725, May, 2015

Abstract

We analyze the problem of regression when both input covariates and output responses are functions from a nonparametric function class. Function to function regression (FFR) covers a large range of interesting applications including time-series prediction problems, and also more general tasks like studying a mapping between two separate types of distributions. However, previous nonparametric estimators for FFR type problems scale badly computationally with the number of input/output pairs in a data-set. Given the complexity of a mapping between general functions it may be necessary to consider large data-sets in order to achieve a low estimation risk. To address this issue, we develop a novel scalable nonparametric estimator, the Triple-Basis Estimator (3BE), which is capable of operating over datasets with many instances. To the best of our knowledge, the 3BE is the first nonparametric FFR estimator that can scale to massive datasets. We analyze the 3BE's risk and derive an upperbound rate. Furthermore, we show an improvement of several orders of magnitude in terms of prediction speed and a reduction in error over previous estimators in various real-world datasets.

BibTeX

@conference{Oliva-2015-119759,
author = {J. Oliva and W. Neiswanger and B. Poczos and E. Xing and J. Schneider},
title = {Fast Function to Function Regression},
booktitle = {Proceedings of 18th International Conference on Artificial Intelligence and Statistics (AISTATS '15)},
year = {2015},
month = {May},
volume = {38},
pages = {717 - 725},
}