Sequential Poisson sampling is a variation of Poisson sampling for drawing probability-proportional-to-size samples with a given number of units, and is commonly used for price-index surveys. This package gives functions to draw stratified sequential Poisson samples according to the method by Ohlsson (1998), as well as other order sample designs by Rosén (1997), and generate appropriate bootstrap replicate weights according to the generalized bootstrap method by Beaumont and Patak (2012).
Get the stable release from CRAN.
install.packages("sps")
The development version can be installed from R-Universe
install.packages("sps", repos = c("https://marberts.r-universe.dev", "https://cloud.r-project.org"))
or directly from GitHub.
pak::pak("marberts/sps")
Given a vector of sizes for units in a population (e.g., revenue for
sampling businesses) and a desired sample size, a stratified sequential
Poisson sample can be drawn with the sps()
function.
library(sps)
# Generate some data on sizes for 12 businesses in a single
# stratum as a simple example
revenue <- c(1:10, 100, 150)
# Draw a sample of 6 businesses
(samp <- sps(revenue, 6))
#> [1] 4 8 9 10 11 12
# Design weights and sampling strata are stored with the sample
weights(samp)
#> [1] 3.437500 1.718750 1.527778 1.375000 1.000000 1.000000
levels(samp)
#> [1] "TS" "TS" "TS" "TS" "TA" "TA"
Allocations are often proportional to size when drawing such samples,
and the prop_allocation()
function provides a variety of methods for
generating proportional-to-size allocations.
# Add some strata
stratum <- rep(c("a", "b"), c(9, 3))
# Make an allocation
(allocation <- prop_allocation(revenue, 6, stratum))
#> a b
#> 3 3
# Draw a stratified sample
(samp <- sps(revenue, allocation, stratum))
#> [1] 5 6 9 10 11 12
weights(samp)
#> [1] 3.000000 2.500000 1.666667 1.000000 1.000000 1.000000
levels(samp)
#> [1] "TS" "TS" "TS" "TA" "TA" "TA"
The design weights for a sample can then be used to generate bootstrap
replicate weights with the sps_repweights()
function.
sps_repweights(weights(samp), 5, tau = 2)
#> [,1] [,2] [,3] [,4] [,5]
#> [1,] 3.0000000 1.50 1.5000000 4.500000 1.500000
#> [2,] 2.2500000 2.25 3.5000000 1.500000 1.500000
#> [3,] 0.6666667 1.50 0.6666667 2.333333 2.333333
#> [4,] 1.0000000 1.00 1.0000000 1.000000 1.000000
#> [5,] 1.0000000 1.00 1.0000000 1.000000 1.000000
#> [6,] 1.0000000 1.00 1.0000000 1.000000 1.000000
#> attr(,"tau")
#> [1] 2
The vignette gives more detail about how to use these functions to draw coordinated samples, top up a sample, and estimate variance.
There are a number of packages on CRAN for drawing samples proportional to size, but these generally do not include the sequential Poisson method. The sampling package contains a function for drawing sequential Poisson samples, but it does not allow for stratification, take-all units, or the use of permanent random numbers. By contrast, the prnsamplr package allows for the use of stratification and permanent random numbers with Pareto order sampling, but does not feature other order-sampling methods (like sequential Poisson).
Beaumont, J.-F. and Patak, Z. (2012). On the Generalized Bootstrap for Sample Surveys with Special Attention to Poisson Sampling. International Statistical Review, 80(1): 127-148.
Ohlsson, E. (1998). Sequential Poisson Sampling. Journal of Official Statistics, 14(2): 149-162.
Rosén, B. (1997). On sampling with probability proportional to size. Journal of Statistical Planning and Inference, 62(2): 159-191.