Speaker: Prof. Holger Dette (Ruhr-10Universität, Bochum, Germany)
Title: Testing relevant hypotheses for functional data
Date: Tuesday, 05/11/2019
Time: 14:30-15:30
Location: Bush House, (SE) 2.10, Strand, WC2R 1AE, King's College London
Abstract: Functional data analysis is typically conducted within the $L^2$-Hilbert space framework. There is by now a fully developed statistical toolbox allowing for the principled application of the functional data machinery to real-world problems, often based on dimension reduction techniques such as functional principal component analysis. At the same time, there have recently been a number of publications that sidestep dimension reduction steps and focus on a fully functional $L^2$-methodology. This paper goes one step further and develops data analysis methodology for functional time series in the space of all continuous functions. The work is motivated by the fact that objects with rather different shapes may still have a small $L^2$-distance and are therefore identified as similar when using an $L^2$-metric. However, in applications it is often desirable to use metrics reflecting the visualization of the curves in the statistical analysis. The methodological contributions are focused on developing two-sample and change-point tests as well as confidence bands, as these procedures appear to be conducive to the proposed setting. Particular interest is put on relevant differences; that is, on not trying to test for exact equality, but rather for pre-specified deviations under the null hypothesis.
Dette, H., Kokot, K., and Aue, A. (2019). Functional data analysis in the banach space of continuous functions. Annals of Statistics, to appear; ArXiv e-print 1710.07781v2.
For further details and to sign up for free:
https://colloquium05112019hdette.eventbrite.co.uk
You may leave the list at any time by sending the command
SIGNOFF allstat
to [log in to unmask], leaving the subject line blank.
|