--- title: "Model fitting" author: Eunseop Kim output: rmarkdown::html_vignette: fig_width: 7 fig_height: 5 vignette: > %\VignetteIndexEntry{Model fitting} %\VignetteEngine{knitr::rmarkdown} %\VignetteEncoding{UTF-8} --- ```{r, include=FALSE} knitr::opts_chunk$set(collapse = TRUE, comment = "#>", dpi = 300) ``` ```{r, echo=FALSE} library(melt, warn.conflicts = FALSE) ``` ## Fitting an `EL` object The melt package provides several functions to construct an `EL` object or an object that inherits from `EL`: * `el_mean()` for the mean. * `el_sd()` for the standard deviation. * `el_lm()` for linear models. * `el_glm()` for generalized linear models. We illustrate the usage of `el_mean()` with the `faithful` data set. ```{r, eval=TRUE} data("faithful") str(faithful) summary(faithful) ``` Suppose we are interested in evaluating empirical likelihood at `c(3.5, 70)`. ```{r} fit <- el_mean(faithful, par = c(3.5, 70)) class(fit) showClass("EL") ``` The `faithful` data frame is coerced to a numeric matrix. Simple print method shows essential information on `fit`. ```{r} fit ``` Note that the maximum empirical likelihood estimates are the same as the sample average. The chi-square value shown corresponds to the minus twice the empirical log-likelihood ratio. It has an asymptotic chi-square distribution of 2 degrees of freedom under the null hypothesis. Hence the $p$-value here is not exact. The convergence status at the bottom can be used to check the convex hull constraint. Weighted data can be handled by supplying the `weights` argument. For non-`NULL` `weights`, weighted empirical likelihood is computed. Any valid `weights` is re-scaled for internal computation to add up to the total number of observations. For simplicity, we use `faithful$waiting` as our weight vector. ```{r} w <- faithful$waiting (wfit <- el_mean(faithful, par = c(3.5, 70), weights = w)) ``` We get different results, where the estimates are now the weighted sample average. The chi-square value and the associated $p$-value are based on the same limit theorem, but care must be taken when interpreting the results since they are largely affected by the limiting behavior of the weights.