zelig-poissonsurvey

Poisson Regression for Event Count Dependent Variables with Survey Weights

Use the Poisson regression model if the observations of your dependent variable represents the number of independent events that occur during a fixed period of time (see the negative binomial model, , for over-dispersed event counts.) For a Bayesian implementation of this model, see .

Syntax

With reference classes:

z5 <- zpoissonsurvey$new()
z5$zelig(Y ~ X1 + X ~ X, weights = w, data = mydata)
z5$setx()
z5$sim()

With the Zelig 4 compatibility wrappers:

z.out <- zelig(Y ~ X1 + X2, model = "poisson.survey", weights = w, data = mydata)
x.out <- setx(z.out)
s.out <- sim(z.out, x = x.out)

Example

Example 1: User has Existing Sample Weights

Attach sample data:

data(api, package="survey")

In this example, we will estimate a model using each school’s academic performance in 2000 and an indicator for year-round schools to predict the number of students who enrolled in each California school.

z.out1 <- zelig(enroll ~ api99 + yr.rnd , model = "poisson.survey", data = apistrat)

## Warning in readLines(zeligmixedmodels): incomplete final line found on
## '/usr/lib64/R/library/ZeligMultilevel/JSON/zelig5mixedmodels.json'

## How to cite this model in Zelig:
##   Nicholas Carnes. 2017.
##   poisson-survey: Poisson Regression with Survey Weights
##   in Christine Choirat, Christopher Gandrud, James Honaker, Kosuke Imai, Gary King, and Olivia Lau,
##   "Zelig: Everyone's Statistical Software," http://zeligproject.org/

summary(z.out1)

## Model:
##
## Call:
## z5$zelig(formula = enroll ~ api99 + yr.rnd, data = apistrat)
##
## Survey design:
## survey::svydesign(data = data, ids = ids, probs = probs, strata = strata,
##     fpc = fpc, nest = nest, check.strata = check.strata, weights = localWeights)
##
## Coefficients:
##              Estimate Std. Error t value Pr(>|t|)
## (Intercept)  7.128292   0.264522   26.95   <2e-16
## api99       -0.000840   0.000409   -2.05    0.041
## yr.rndYes    0.055620   0.173048    0.32    0.748
##
## (Dispersion parameter for poisson family taken to be 391)
##
## Number of Fisher Scoring iterations: 5
##
## Next step: Use 'setx' method

Set explanatory variables to their default (mean/mode) values, and set a high (80th percentile) and low (20th percentile) value for the measure of academic performance, “api00”:

x.low <- setx(z.out1, api99= quantile(apistrat$api99, 0.2))
x.high <- setx(z.out1, api99= quantile(apistrat$api99, 0.8))

Generate first differences for the effect of high versus low “meals” on the probability that a school will hold classes year round:

s.out1 <- sim(z.out1, x=x.low, x1=x.high)
summary(s.out1)

##
##  sim x :
##  -----
## ev
##      mean   sd 50% 2.5% 97.5%
## [1,]  817 61.7 815  705   941
## pv
##      mean   sd 50% 2.5% 97.5%
## [1,]  818 67.1 817  689   953
##
##  sim x1 :
##  -----
## ev
##      mean   sd 50% 2.5% 97.5%
## [1,]  672 47.3 670  584   770
## pv
##      mean sd 50% 2.5% 97.5%
## [1,]  672 53 670  567   773
## fd
##      mean   sd  50% 2.5% 97.5%
## [1,] -146 72.3 -145 -288 -9.96

Generate a second set of fitted values and a plot:

plot(s.out1)

Graphs of Quantities of Interest for Poisson Survey Model

Example 2: User has Details about Complex Survey Design (but not sample weights)

Suppose that the survey house that provided the dataset excluded probability weights but made other details about the survey design available. We can still estimate a model without probability weights that takes instead variables that identify each the stratum and/or cluster from which each observation was selected and the size of the finite sample from which each observation was selected.

z.out2 <- zelig(enroll ~ api99 + yr.rnd , model = "poisson.survey", data = apistrat,
  strata=~stype, fpc=~fpc)

## Warning in readLines(zeligmixedmodels): incomplete final line found on
## '/usr/lib64/R/library/ZeligMultilevel/JSON/zelig5mixedmodels.json'

## How to cite this model in Zelig:
##   Nicholas Carnes. 2017.
##   poisson-survey: Poisson Regression with Survey Weights
##   in Christine Choirat, Christopher Gandrud, James Honaker, Kosuke Imai, Gary King, and Olivia Lau,
##   "Zelig: Everyone's Statistical Software," http://zeligproject.org/

summary(z.out2)

## Model:
##
## Call:
## z5$zelig(formula = enroll ~ api99 + yr.rnd, data = apistrat,
##     strata = ~stype, fpc = ~fpc)
##
## Survey design:
## survey::svydesign(data = data, ids = ids, probs = probs, strata = strata,
##     fpc = fpc, nest = nest, check.strata = check.strata, weights = localWeights)
##
## Coefficients:
##              Estimate Std. Error t value Pr(>|t|)
## (Intercept)  6.928759   0.217782   31.82   <2e-16
## api99       -0.000898   0.000332   -2.71   0.0073
## yr.rndYes    0.120713   0.109743    1.10   0.2727
##
## (Dispersion parameter for poisson family taken to be 314)
##
## Number of Fisher Scoring iterations: 5
##
## Next step: Use 'setx' method

The coefficient estimates from this model are identical to point estimates in the previous example, but the standard errors are smaller. When sampling weights are omitted, Zelig estimates them automatically for “normal.survey” models based on the user-defined description of sampling designs. In addition, when user-defined descriptions of the sampling design are entered as inputs, variance estimates are better and standard errors are consequently smaller.

The methods setx() and sim() can then be run on z.out2 in the same fashion described in Example 1.

Example 3: User has Replicate Weights

Load data for a model using the number of out-of-hospital cardiac arrests to predict the number of patients who arrive alive in hospitals.

data(scd, package="survey")

For the purpose of illustration, create four Balanced Repeated Replicate (BRR) weights:

BRRrep<-2*cbind(c(1,0,1,0,1,0), c(1,0,0,1,0,1), c(0,1,1,0,0,1), c(0,1,0,1,1,0))

Estimate the model using Zelig:

z.out3 <- zelig(alive ~ arrests , model = "poisson.survey",
  repweights=BRRrep, type="BRR", data=scd)

## Warning in readLines(zeligmixedmodels): incomplete final line found on
## '/usr/lib64/R/library/ZeligMultilevel/JSON/zelig5mixedmodels.json'

## Warning in svrepdesign.default(data = data, repweights = repweights, type
## = type, : No sampling weights provided: equal probability assumed

## How to cite this model in Zelig:
##   Nicholas Carnes. 2017.
##   poisson-survey: Poisson Regression with Survey Weights
##   in Christine Choirat, Christopher Gandrud, James Honaker, Kosuke Imai, Gary King, and Olivia Lau,
##   "Zelig: Everyone's Statistical Software," http://zeligproject.org/

summary(z.out3)

## Model:
##
## Call:
## z5$zelig(formula = alive ~ arrests, data = scd, repweights = BRRrep,
##     type = "BRR")
##
## Survey design:
## svrepdesign.default(data = data, repweights = repweights, type = type,
##     weights = localWeights, combined.weights = combined.weights,
##     rho = rho, bootstrap.average = bootstrap.average, scale = scale,
##     rscales = rscales, fpctype = fpctype, fpc = fpc)
##
## Coefficients:
##             Estimate Std. Error t value Pr(>|t|)
## (Intercept) 3.155257   0.142695   22.11    0.002
## arrests     0.001934   0.000266    7.27    0.018
##
## (Dispersion parameter for poisson family taken to be 1.08)
##
## Number of Fisher Scoring iterations: 4
##
## Next step: Use 'setx' method

Set the explanatory variables at their means and set arrests at its 20th and 80th quartiles

x.low <- setx(z.out3, arrests = quantile(scd$arrests, .2))
x.high <- setx(z.out3, arrests = quantile(scd$arrests,.8))

Generate first differences for the effect of the minimum versus the maximum number of individuals who arrive alive on the probability that a hospital will be sued:

s.out3 <- sim(z.out3, x=x.high, x1=x.low)
summary(s.out3)

##
##  sim x :
##  -----
## ev
##      mean   sd  50% 2.5% 97.5%
## [1,] 65.3 4.44 65.1 56.8  74.4
## pv
##      mean   sd 50% 2.5% 97.5%
## [1,] 65.3 9.01  65   49    84
##
##  sim x1 :
##  -----
## ev
##      mean   sd  50% 2.5% 97.5%
## [1,] 29.8 3.52 29.6 23.4  36.9
## pv
##      mean   sd 50% 2.5% 97.5%
## [1,] 29.6 6.31  29   18    43
## fd
##       mean   sd   50%  2.5% 97.5%
## [1,] -35.5 4.41 -35.4 -44.6 -27.1

Generate a second set of fitted values and a plot:

plot(s.out3)

Graphs of Quantities of Interest for Poisson Survey Model

The user should also refer to the poisson model demo, since poisson.survey models can take many of the same options as poisson models.

Model

Let be the number of independent events that occur during a fixed time period. This variable can take any non-negative integer.

  • The Poisson distribution has stochastic component

    where is the mean and variance parameter.

  • The systematic component is

    where is the vector of explanatory variables, and \beta is the vector of coefficients.

Quantities of Interest

  • The expected value (qi$ev) is the mean of simulations from the stochastic component,

    given draws of \beta from its sampling distribution.

  • The predicted value (qi$pr) is a random draw from the poisson distribution defined by mean .

  • The first difference in the expected values (qi$fd) is given by:

  • In conditional prediction models, the average expected treatment effect (att.ev) for the treatment group is

    where is a binary explanatory variable defining the treatment () and control () groups. Variation in the simulations are due to uncertainty in simulating , the counterfactual expected value of for observations in the treatment group, under the assumption that everything stays the same except that the treatment indicator is switched to .

  • In conditional prediction models, the average predicted treatment effect (att.pr) for the treatment group is

    where is a binary explanatory variable defining the treatment () and control () groups. Variation in the simulations are due to uncertainty in simulating , the counterfactual predicted value of for observations in the treatment group, under the assumption that everything stays the same except that the treatment indicator is switched to .

Output Values

The Zelig object stores fields containing everything needed to rerun the Zelig output, and all the results and simulations as they are generated. In addition to the summary commands demonstrated above, some simply utility functions (known as getters) provide easy access to the raw fields most commonly of use for further investigation.

In the example above z.out$getcoef() returns the estimated coefficients, z.out$getvcov() returns the estimated covariance matrix, and z.out$getpredict() provides predicted values for all observations in the dataset from the analysis.

See also

The poissonsurvey model is part of the survey package by Thomas Lumley, which in turn depends heavily on the glm package. Advanced users may wish to refer to help(glm) and help(family).

Lumley T (2016). “survey: analysis of complex survey samples.” R package version 3.31-5.

Lumley T (2004). “Analysis of Complex Survey Samples.” Journal of Statistical Software, 9 (1), pp. 1-19. R package verson 2.2.