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summary.ideal

summary of an ideal object


Description

Provides a summary of the output from ideal point estimation contained in an object of class ideal.

Usage

## S3 method for class 'ideal'
summary(object, prob=.95,
              burnin=NULL,
              sort=TRUE,
              include.beta=FALSE,...)

Arguments

object

an object of class ideal.

prob

scalar, a proportion between 0 and 1, the content of the highest posterior density (HPD) interval to compute for the parameters

burnin

of the recorded MCMC samples, how many to discard as burnin? Default is NULL, in which case the value of burnin in the ideal object is used.

sort

logical, default is TRUE, indicating that the summary of the ideal points be sorted by the estimated posterior means (lowest to highest)

include.beta

whether or not to calculate summary statistics of beta, if beta is available. If the item parameters were not stored in the ideal object, then include.beta is ignored.

...

further arguments passed to or from other functions

Details

The test of whether a given discrimination parameter is distinguishable from zero first checks to see if the two most extreme quantiles are symmetric around .5 (e.g., as are the default value of .025 and .975). If so, the corresponding quantiles of the MCMC samples for each discrimination parameter are inspected to see if they have the same sign. If they do, then the corresponding discrimination parameter is flagged as distinguishable from zero; otherwise not.

Value

An item of class summary.ideal with elements:

object

the name of the ideal object as an unevaluated expression, produced by match.call()$object

xm

n by d matrix of posterior means for the ideal points

xsd

n by d matrix of posterior means for the ideal points

xHDR

n by 2 by d array of HDRs for the ideal points

bm

m by d+1 matrix of posterior means for the item parameters

bsd

m by d+1 matrix of posterior standard deviation for the item parameters

bHDR

m by 2 by d+1 array of HDRs for the item parameters

bSig

a list of length d, each component a vector of length m, of mode logical, equal to TRUE if the corresponding discrimination parameter is distinguishable from zero; see Details. If store.item was set to FALSE when ideal was invoked, then bSig is a list of length zero.

party.quant

if party information is available through the rollcall object that was used to run ideal, then party.quant gives the posterior mean of the legislators' ideal points by party, by dimension. If no party information is available, then party.quant=NULL.

Note

When specifying a value of burnin different from that used in fitting the ideal object, note a distinction between the iteration numbers of the stored iterations, and the number of stored iterations. That is, the n-th iteration stored in an ideal object will not be iteration n if the user specified thin>1 in the call to ideal. Here, iterations are tagged with their iteration number. Thus, if the user called ideal with thin=10 and burnin=100 then the stored iterations are numbered 100, 110, 120, .... Any future subsetting via a burnin refers to this iteration number.

Author(s)

See Also

Examples

f <- system.file("extdata","id1.rda",package="pscl")
load(f)
summary(id1)

## Not run: 
data(s109)
cl2 <- constrain.legis(s109,
                       x=list("KENNEDY (D MA)"=c(-1,0),
                         "ENZI (R WY)"=c(1,0),
                         "CHAFEE (R RI)"=c(0,-.5)),
                       d=2)
id2Constrained <- ideal(s109,
                        d=2,
                        priors=cl2,      ## priors (w constraints)
                        startvals=cl2,   ## start value (w constraints)
                        store.item=TRUE,
                        maxiter=5000,
                        burnin=500,
                        thin=25)

summary(id2Constrained,
        include.items=TRUE)

## End(Not run)

pscl

Political Science Computational Laboratory

v1.5.5
GPL-2
Authors
Simon Jackman, with contributions from Alex Tahk, Achim Zeileis, Christina Maimone, Jim Fearon and Zoe Meers
Initial release
2020-02-25

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