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285 lines
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285 lines
10 KiB
Plaintext
8 months ago
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{smcl}
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{* 28nov2005}{...}
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{hline}
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help for {hi:micombine}{right:(SJ5-4: st0067_2; SJ5-2: st0067_1; SJ4-3: st0067)}
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{hline}
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{title:Estimation of regression models with multiply imputed samples}
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{p 8 18 2}
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{cmd:micombine}
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{{it:supported_regression_cmd} | {it:other_regression_cmd}}
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[{it:yvar}]
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[{it:covarlist}]
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[{it:other_stuff]}
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{ifin}
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{weight}
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[{cmd:,}
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{cmd:br}
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{cmdab:nocons:tant}
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{cmdab:det:ail}
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{cmdab:ef:orm}[{cmd:(}{it:string}{cmd:)}]
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{cmdab:g:enxb(}{it:newvarname}{cmd:)}
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{cmdab:imp:id(}{it:varname}{cmd:)}
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{cmd:lrr}
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{cmdab:nowar:ning}
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{cmdab:obs:id(}{it:varname}{cmd:)}
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{it:regression_cmd_options}]
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{p 4 4 2}
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where
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{p 8 8 2}
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{it:supported_regression_cmd}s are
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{helpb clogit},
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{helpb cnreg},
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{helpb glm},
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{helpb logistic},
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{helpb logit},
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{helpb mlogit},
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{helpb ologit},
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{helpb oprobit},
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{helpb poisson},
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{helpb probit},
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{helpb qreg},
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{helpb regress},
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{helpb rreg},
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{helpb stcox},
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{helpb streg},
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or
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{helpb xtgee}, and {it:other_regression_cmd} is any other Stata regression command
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(see Remarks).
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{p 4 4 2}
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{cmd:micombine} shares a subset of the features of all {help estcom:estimation commands};
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see {it:Remarks}.
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{p 4 4 2}
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All weight types supported by {it:regression_cmd} are allowed; see
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{help weight}.
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{title:Description}
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{p 4 4 2}
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{cmd:micombine} estimates the parameters of a regression model whose
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type is determined by {it:supported_regression_cmd} or {it:other_regression_cmd}.
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Parameter estimates are combined
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across several replicates obtained previously by multiple imputation,
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e.g. by using {helpb ice} to create a file of imputed data.
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See {it:Remarks} for a brief account of how {cmd:micombine} combines
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the estimates and obtains standard errors.
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{title:Options}
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{p 4 8 2}
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{cmd:br} calculates degrees of freedom and tests of significance for each predictor
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according to the formulae (3)-(5) of Barnard & Rubin (1999).
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After estimation, the required degrees of freedom are stored in a matrix
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(column vector) {cmd:e(nutilde)}. Note that if {cmd:test}
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is used after {cmd:micombine} for significance testing of regression
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coefficients, such tests assume that the degrees of freedom are
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equal to the number of observations minus the number of parameters
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estimated, not those given in {cmd:e(nutilde)}.
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{p 4 8 2}
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{cmd:noconstant} suppresses the regression constant in all regressions.
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{p 4 8 2}
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{cmd:detail} gives details of the regression model for each imputation.
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{p 4 8 2}
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{cmd:eform}[{cmd:(}{it:string}{cmd:)}] specifies that the exponentiated form
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of the coefficients be output and that the constant not be reported.
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The exponentiated coefficients are labeled {cmd:exp(b)}, unless
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the optional {it:string} is used.
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{p 4 8 2}
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{cmd:genxb(}{it:newvarname}{cmd:)} creates {it:newvarname} to hold the
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linear predictor from each regression model, averaged over all the
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imputations.
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{p 4 8 2}
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{cmd:impid(}{it:varname}{cmd:)} specifies that {it:varname} is the variable
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identifying the imputations. The number of imputations is determined as
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the number of unique values of {it:varname}. All observations for which
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{it:varname} takes the value zero are ignored in the analysis.
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The default {it:varname} is {cmd:_j}.
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{p 4 8 2}
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{cmd:lrr} specifies that the Li-Raghunathan-Rubin (LRR) robust estimate of the
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variance-covariance matrix of the regression coefficients be used.
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{p 4 8 2}
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{cmd:nowarning} suppresses the warning message about the use
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of {it:other_regression_cmd}s (see {it:Remarks}).
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{p 4 8 2}
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{cmd:obsid(}{it:varname}{cmd:)} is provided to allow {cmd:micombine} to analyze
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datasets created by programs other than {cmd:ice}. {it:varname} specifies the name
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of a variable holding the "observation ID", i.e. the sequence number of each
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observation in a given imputation. The number of observations should
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be identical between imputations, as should the order of the observations.
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{it:varname} should run 1,...,N for imputation 1, 1,...,N for imputation 2, and
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so on. {cmd:ice} automatically stores the information with the data, so this
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option is not required. The default {it:varname} is {cmd:_i}.
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{p 4 8 2}
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{it:regression_cmd_options} may be any of the options appropriate to
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{it:regression_cmd}.
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{title:Remarks}
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{p 4 4 2}
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Details of statistical inference from multiple imputed datasets are nicely
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described in a recent Stata Journal article by John Carlin and colleagues
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(Carlin et al. 2003). Here, with due acknowledgment to John, I give an edited
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version of section 2 of his article.
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{p 4 4 2}
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A simple method of combining estimates from several models was derived by
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Rubin (1987). Suppose initially that primary interest lies in estimating a
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scalar quantity, Q. Here, Q is a regression coefficient, for example, the log
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hazard ratio in a proportional hazards model. Suppose that we have imputed m
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complete datasets using an appropriate model. In each dataset, standard
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complete-data methods are used to obtain an estimate of Q with an associated
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standard error. Let Q(k) and U(k) denote the point estimate and variance
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respectively from the kth (k = 1, 2, ... , m) dataset. The point estimate Q^
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of Q from multiple imputation is simply the arithmetic mean of Q(1),...,Q(k).
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{p 4 4 2}
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Obtaining a valid standard error for this estimate of Q^ requires combining
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information on within-imputation and between-imputation variation. The latter
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is important in reflecting uncertainty due to variability between imputation
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samples. First, a within-imputation variance component, W, is obtained as the
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mean of the complete-data variance estimates, Q(1),....,Q(k). Second, a
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between-imputation variance component, B, is calculated as the sum of squares
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of Q(1),....,Q(k) about Q^, divided by m-1. The (total) variance T of Q^ is
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given by
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{p 8 12 2}
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T = W + B * (1 + 1/m)
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{p 4 4 2}
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Rubin (1987) showed that (Q - Q^)/sqrt(T) is distributed approximately
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as Student's t on nu degrees of freedom, where
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{p 8 12 2}
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nu = (m - 1) * (1 + W /(B * (1 + 1/m)))^2
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{p 4 4 2}
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The (1 + 1/m) term in these expressions indicates that it is not necessary to
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a create large number of imputed datasets, particularly when B is much smaller
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than W. The condition will be satisfied unless there is much missing data and
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the parameter estimates within each dataset are very precise.
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{title:Available regression commands}
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{p 4 4 2}
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{cmd:micombine} has been tested with the commands listed under
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{it:supported_regression_cmd} at the beginning of this help file.
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{cmd:micombine} {it:may} work satisfactorily with {it:other_regression_cmd}s,
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but this cannot be guaranteed. This facility is provided so that the
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researcher familiar with a particular Stata command has a fighting chance of
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obtaining correct MI estimates and standard errors. HOWEVER, THE AUTHOR
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DISCLAIMS ALL RESPONSIBILITY FOR THE CORRECTNESS OF RESULTS ARISING FROM USE
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OF AN {it:other_regression_cmd}. Note that {it:other_stuff} in the syntax
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diagram is code that may be required by some {it:other_regression_cmd}s, for
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example {cmd:ivreg} wants {cmd:(}{it:varlist2}{cmd: = }{it:varlist_iv}{cmd:)}.
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{cmd:micombine} parses for the occurrence of an opening parenthesis. There may
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be other syntaxes that are not accommodated by this approach; if so, please
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contact the author with details.
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{title:Postestimation prediction}
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{p 4 4 2}
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The {cmd:predict} command {it:may} work as you expect after {cmd:micombine},
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but this feature should be regarded as under development and should be
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treated with caution. {cmd:micombine} stores the quantities needed by
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{cmd:predict} at the last execution of the regression command, that is at the
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final imputation, but prediction following some regression commands has
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non-standard features that are hard to emulate accurately.
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Known issues are as follows:
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{p 8 12 2}
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1. After {cmd:micombine mlogit}: {cmd:predict} may require that the outcome
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levels are known as 0, 1, 2, ... , so it may be necessary to drop the
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score label for the outcome variable, if such a label is defined.
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This is KNOWN to be a problem using {cmd:mfx} following {cmd:micombine mlogit}.
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For example, {cmd:mfx compute, predict(outcome(0))} will work only if
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the lowest level of the outcome is 0, and is not labeled.
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{p 8 12 2}
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2. After {cmd:micombine} with a restricted sample (i.e. using {cmd:if},
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{cmd:in} or zero weights for some observations, or some members
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of {it:covarlist} still have missing values), the system variable
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{cmd:e(sample)} is defined as you would expect it to be
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only for the final imputation. In all earlier imputations it
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is zero. Although not necessarily convenient for use of
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{cmd:e(sample)} in data analysis, the behavior is correct for the
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purposes of {cmd:predict}, since the relevant sample size and
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estimation sample are properties of (any) one imputation,
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but not of the complete assembly of imputations.
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{title:Examples}
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{p 4 8 2}{cmd:. ice y x1 x2 x3 using imp, m(10) genmiss(m_)}{p_end}
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{p 4 8 2}{cmd:. use imp, clear}{p_end}
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{p 4 8 2}{cmd:. micombine regress y x1 x2 x3}{p_end}
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{p 4 8 2}{cmd:. stset time, failure(cens)}{p_end}
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{p 4 8 2}{cmd:. micombine stcox x1 x2 x3, genxb(index)}{p_end}
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{p 4 8 2}{cmd:. test x2==1}{p_end}
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{p 4 8 2}{cmd:. testparm x1 x2}{p_end}
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{title:Author}
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{p 4 4 2}
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Patrick Royston, MRC Clinical Trials Unit, London.
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patrick.royston@ctu.mrc.ac.uk
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{title:References}
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{p 4 8 2}
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Barnard, J. and D. B. Rubin. 1999. Small-sample degrees of freedom with
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multiple imputation. {it:Biometrika} 86: 948-955.
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{p 4 8 2}
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Carlin, J. B., N. Li, P. Greenwood, and C. Coffey. 2003.
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Tools for analyzing multiple imputed datasets. {it:Stata Journal} 3(3): 226-244.
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{p 4 8 2}
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Carlin, J. B., N. Li, P. Greenwood, and C. Coffey. 2003.
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Tools for analyzing multiple imputed datasets. {it:Stata Journal} 3(3): 226-244.
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{p 4 8 2}
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Li, K., T. Raghunathan, and D. Rubin. 1991. Large sample significance levels
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from multiply-imputed data using moment-based statistics and an F reference
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distribution. {it:Journal of the American Statistical Association} 86: 1065-1073.
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{p 4 8 2}
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Rubin, D. 1987. {it:Multiple Imputation for Nonresponse in Surveys}. New York:
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Wiley.
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{p 4 8 2}
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Schafer, J. 1997. {it:Analysis of Incomplete Multivariate Data}. London:
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Chapman & Hall.
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{p 4 8 2}
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van Buuren, S., H. C. Boshuizen and D. L. Knook. 1999. Multiple imputation of
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missing blood pressure covariates in survival analysis.
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{it:Statistics in Medicine} 18: 681-694.
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(Also see http://www.multiple-imputation.com.)
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{title:Also see}
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{psee}
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Online: {helpb ice}
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{p_end}
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