Paper Info
Title
A Kernel Test of Goodness of Fit.
Abstract
We propose a nonparametric statistical test for goodness-of-fit: given a set of samples, the test determines how likely it is that these were generated from a target density function. The measure of goodness-of-fit is a divergence constructed via Stein's method using functions from a Reproducing Kernel Hilbert Space. Our test statistic is based on an empirical estimate of this divergence, taking the form of a V-statistic in terms of the log gradients of the target density and the kernel. We derive a statistical test, both for i.i.d. and non-i.i.d. samples, where we estimate the null distribution quantiles using a wild bootstrap procedure. We apply our test to quantifying convergence of approximate Markov Chain Monte Carlo methods, statistical model criticism, and evaluating quality of fit vs model complexity in nonparametric density estimation.
Year
Venue
Field
2016
ICML
Test statistic,Markov chain Monte Carlo,Kernel embedding of distributions,Statistics,Variable kernel density estimation,Goodness of fit,Mathematics,Reproducing kernel Hilbert space,Null distribution,Kernel (statistics)
DocType
Citations 
PageRank 
Conference
6
0.60
References 
Authors
15
3
Name
Order
Citations
PageRank
Kacper Chwialkowski1503.68
Heiko Strathmann2825.84
Arthur Gretton33638226.18