Author: Gian Carlo Di-Luvi
STAT 547C final project
UBC Statistics
Github template adapted from Dr. Ben Bloem-Reddy
Exchangeability is a fundamental concept in probability theory which has profound theoretical implications, amongst them de Finetti's representation theorem. Essentially, any exchangeable sequence---one that is distribution-invariant under finite permutations---can be represented as conditionally independent given a unique measure. However, in situations in which the process of interest depends on a sequence of covariates, exchangeability is seldom satisfied. Multiple extended notions of exchangeability have been proposed to overcome this, with some of them even having de Finetti-like representation theorems. We study three specific notions of exchangeability that play a central role in dependence modelling: partial, local, and regression exchangeability. We argue that there is a trade-off between how adequate each notion is and how powerful it can be in terms of its theoretical implications. Furthermore, we do an in-depth study of these concepts in the context of Gaussian process regression, finding that it satisfies most of these expanded notions of exchangeability. This means that representation theorems for Gaussian processes do exist, and simple modifications of the arguments we present generalize this for other models for statistical dependence. Whether a Gaussian process has noisy observations or not also plays a central role in determining its exchangeability, which hints at a stark difference between models with and without replicates. Lastly, we conjecture a de Finetti-like representation result for regression exchangeability which (i) to the best of our knowledge does not yet exist and (ii) would make this relatively new notion a powerful theoretical tool for regression analysis.
Each directory includes its own README file. In general:
docincludes the written portions of the project: main, sections, appendices, and project outline tex/pdfs/aux files.misccontains miscelaneous files.refhas the bib file for generating the project's references.srcincludes the R code developed for the project.