--- title: "Using the convdistr package" author: "John J. Aponte" date: "`r Sys.Date()`" output: rmarkdown::html_vignette vignette: > %\VignetteIndexEntry{Using the convdistr package} %\VignetteEngine{knitr::rmarkdown} %\VignetteEncoding{UTF-8} --- ```{r setup, include = FALSE} knitr::opts_chunk$set( collapse = TRUE, comment = "#>" ) summary.DISTRIBUTION <- function(object,...) { knitr::kable(convdistr:::summary.DISTRIBUTION(object,...), digits = 2) } ``` The `convdistr` package provide tools to define distribution objects and make mathematical operations with them. It keep track of the results as if they where scalar numbers but maintaining the ability to obtain randoms samples of the convoluted distributions. To install this package from github `devtools::install_github("johnaponte/convdistr", build_manual = T, build_vignettes = T)` ## Practical example What would be the resulting distribution of $a+b*c$ if $a$ is a __normal__ distribution with mean 1 and standard deviation 0.5, $b$ is a __poisson__ distribution with lambda 5 and $c$ is a __beta__ distribution with shape parameters 10 and 20? ```{r, fig.width=7} library(convdistr) library(ggplot2) a <- new_NORMAL(1,0.5) b <- new_POISSON(5) c <- new_BETA(10,20) res <- a + b * c metadata(res) summary(res) ggDISTRIBUTION(res) + ggtitle("a + b * c") ``` ```{r echo=FALSE, results='hide'} sum_res <- convdistr:::summary.DISTRIBUTION(res) r_oval <- format(sum_res$oval, digits = 3) r_mean <- format(sum_res$mean_, digits = 3) r_median <- format(sum_res$median_, digits = 3) r_lci <- format(sum_res$lci_, digits = 2) r_uci <- format(sum_res$uci_, digits = 3) ``` The result is a distribution with expected value `r r_oval`. A sample from 10000 drawns of the distribution shows a mean value of `r r_mean`, a median of `r r_median` and 95% quantiles of `r r_lci`, `r r_uci` The following sections describe the DISTRIBUTION object, how to create new DISTRIBUTION objects and how to make operations and mixtures with them. Please note that when convoluting distributions, this package assumes the distributions are independent between them, i.e. their correlation is 0. If not, you need to implement specific distributions to handle the correlation, like the MULTIVARIATE object. ## Description of the `DISTRIBUTION` object The `DISTRIBUTION` is kind of abstract class (or interface) that specific constructors should implement. It contains 4 fields: **distribution** : A character with the name of the distribution implemented **seed** : A numerical seed that is use to get a repeatable sample in the `summary` function **oval** : The observed value. It is the value expected. It is used as a number for the mathematical operations of the distributions as if they were a simple scalar **rfunc(n)** : A function that generate random numbers from the distribution. Its only parameter `n` is the number of drawns of the distribution. It returns a matrix with as many rows as `n`, and as many columns as the dimensions of the distributions The DISTRIBUTION object can support multidimensional distributions for example a dirichlet distribution. The names of the dimensions should coincides with the names of the `oval` vector. If it has only one dimension, the default name is `rvar`. It is expected that the `rfunc` could be included in the creation of new distributions by convolution or mixture, so the environment should be carefully controlled to avoid reference leaking that is possible within the R language. For that reason, the `rfunc` should be created within a `restrict_environment` function that controls that only the variables that are required within the `function` are saved in the environment of the function. Once the new objects are instanced, the fields are immutable and should not be changed. ## Factory of `DISTRIBUTION` objects The following functions create new objects of class `DISTRIBUTION` | Distribution | factory | parameters | function | |--------------|-----------------|------------------------------|------------| | uniform | new_UNIFORM | p_min, p_max | runif | | normal | new_NORMAL | p_mean, p_sd | rnorm | | beta | new_BETA | p_shape1, p_shape2 | rbeta | | beta | new_BETA_lci | p_mean, p_lci, p_uci | rbeta | | triangular | new_TRIANGULAR | p_min, p_max, p_mode | rtriangular| | poisson | new_POISSON | p_lambda | rpoisson | | exponential | new_EXPONENTIAL | p_rate | rexp | | discrete | new_DISCRETE | p_supp, p_prob | sample | | dirichlet | new_DIRICHLET | p_alpha, p_dimnames | rdirichlet | | truncated | new_TRUNCATED | p_distribution, p_min, p_max | | | dirac | new_DIRAC | p_value | | | NA | new_NA | p_dimnames | | ## Methods The following are methods for all objects of class `DISTRIBUTION` * `metadata(x)` Print the metadata for the distribution * `summary(object, n=10000)` Produce a summary of the distribution * `rfunc(x, n)` Generate `n` random drawns of the distribution * `plot(x, n= 10000)` Produce a density plot of the distribution * `ggDISTRIBUTION(x, n= 10000)` produce a density plot of the distribution using ggplot2 ```{r} myDistr <- new_NORMAL(0,1) metadata(myDistr) rfunc(myDistr, 10) summary(myDistr) ``` ```{r, fig.width=5, fig.cap = "Figure with R plot"} plot(myDistr) ``` ```{r, fig.width=5, fig.cap = "Figure with ggplot2"} ggDISTRIBUTION(myDistr) ``` ## Convolution for Distribution with the same dimensions Mathematical operations like `+`, `-`, `*`, `/` between `DISTRIBUTION` with the same dimensions can be perform with the `new_CONVOLUTION(listdistr, op, omit_NA = FALSE)` function. The `listdistr` parameter is a list of `DISTRIBUTION` objects on which the operation is made. A shorter version exists for each one of the operations as follow * `new_SUM(listdistr, omit_NA = FALSE)` * `new_SUBTRACTION(listdistr, omit_NA = FALSE)` * `new_MULTIPLICATION(listdistr, omit_NA = FALSE)` * `new_DIVISION(listdistr, omit_NA = FALSE)` but Mathematical operator can also be used. ```{r, fig.width = 5} d1 <- new_NORMAL(1,1) d2 <- new_UNIFORM(2,8) d3 <- new_POISSON(5) dsum <- new_SUM(list(d1,d2,d3)) dsum d1 + d2 + d3 summary(dsum) ggDISTRIBUTION(dsum) ``` ## Mixture A `DISTRIBUTION`, consisting on the mixture of several distribution can be obtained with the `new_MIXTURE(listdistr, mixture)` function where `listdistr` is a list of `DISTRIBUTION` objects and `mixture` the vector of probabilities for each distribution. If missing the mixture, the probability will be the same for each distribution. ```{r, fig.width = 7} d1 <- new_NORMAL(1,0.5) d2 <- new_NORMAL(5,0.5) d3 <- new_NORMAL(10,0.5) dmix <- new_MIXTURE(list(d1,d2,d3)) summary(dmix) ggDISTRIBUTION(dmix) ``` ## Convolution of distributions with different dimensions When convoluting distribution with different dimensions, there are two possibilities. The `new_CONVOLUTION_assoc` family of functions perform the operation only on the common dimensions and left the others dimensions as they are, or the `new_CONVOLUTION_comb` family of functions which perform the operation in the combination of all dimensions. ```{r, fig.with = 7} d1 <- new_MULTINORMAL(c(0,1), matrix(c(1,0.3,0.3,1), ncol = 2), p_dimnames = c("A","B")) d2 <- new_MULTINORMAL(c(3,4), matrix(c(1,0.3,0.3,1), ncol = 2), p_dimnames = c("B","C")) summary(d1) summary(d2) summary(new_SUM_assoc(d1,d2)) summary(new_SUM_comb(d1,d2)) ```