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This paper discusses the need for improved tools to analyze datasets with missing values. It introduces Multiple Imputation (MI) based on Bayesian principles. The analysis involves imputing missing values multiple times, creating completed datasets for separate analysis. The process utilizes standard estimation methods and Rubin's Rules for combining results. The article also compares the existing tools in Stata - MI Tools and ICE/MICOMBINE - highlighting their limitations. MIM introduces a new architecture to unify and enhance functionality, with improved post-estimation facilities and support for a wider range of commands.
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A new architecture for handling multiply imputed data in Stata JC Galati1, JB Carlin1,2, P Royston3 1Murdoch Childrens Research Institute (MCRI), Melbourne 2The University of Melbourne 3MRC Clinical Trials Unit, London
Missing data • Why do we need additional tools for analysing datasets with missing values? • Traditional methods work with complete datasets • Statistical packages discard incomplete observations when analysing an incomplete dataset • i.e. a complete-case analysis is performed • This can lead to loss of power, and possibly to biased estimates, depending on why the data went missing
Multiple imputation (MI) • Introduced by Donald Rubin (1987 book, Wiley) • Based on Bayesian principles • Both the data-generating mechanism and the missingness mechanism are modelled • Fairly broad assumptions about data-generating model • Fairly restrictive assumptions about missingness mechanism • Modelling assumptions apply at the imputation level • Statistical modelling is general (once data is imputed) • Post estimation – some; more work needs to be done • Diagnostics – theory and practice not yet worked out • Model-building – in its infancy – work has started
MI data analysis • Start with a dataset with some values missing • Missing values are imputed multiple times • Using a Bayesianly “proper” imputation method • This creates m sets of completed data • Each completed dataset is analysed separately: • Standard complete-data estimation methods are used • E.g. linear regression, logistic regression
Inference (estimation) using MI • Coefficient estimates and variances (SE’s) from complete-data analyses are combined using Rubin’s Rules: • Parameter estimates: • Average of the complete-data parameter estimates • Variance is the sum of two components: • Within-imputation variance (average of the complete-data variances) • Between-imputation variance (determined from complete-data parameter estimates) • Point estimators divided by SE have approximate t distributions • Estimate d.f. and use t-multipliers to get confidence intervals
Background (MI in Stata) • What is available in Stata currently? • “MI Tools,” Carlin et. al. Stata J. 2003: • Imputed datasets stored in separate dta files myfile1.dta, ... , myfile`m’.dta • Estimation: • mifit with: regress, logit, probit, clogit, glm, logistic, poisson, svyreg, svylogit, svyprobit, svypoisson, xtgee, xtreg • Post estimation: milincom, mitestparm • Data manipulation miset, miappend, mimerge, mido, misave
Background (MI in Stata) • Main drawbacks of “MI Tools”: • Loose association between original and imputed data • Loose association between individual imputed datasets • Limit to range of estimation commands supported (13) • Choice of coding of some aspects resulted in slow execution time in some cases • No capacity to perform imputation
Background (MI in Stata) • What is available in Stata currently? (cont.) • ice, micombine, Royston Stata J. 2004/05: • ice stores imputed datasets in a single dta file • uses impid and obsid vars • Estimation: • micombine with clogit, cnreg, glm, logistic, logit, poisson, probit, qreg, regress, rreg, xtgee, streg, stcox, ologit, oprobit, mlogit • Post estimation: • results returned in e(b) , e(V) etc. • onus on user to know when post-estimation command applied directly to combined estimates is valid
Background (MI in Stata) • ice, micombine, Royston Stata J. 2004/05 (cont.): • Data manipulation • left to user, but stacked format facilitates simple transformation of variables etc. • mijoin, misplit (for conversion between formats) • Main drawbacks • Limit to range of estimation commands supported (16) • Manipulation that changes number of observations in each dataset not easily supported (eg. reshape) • Not clear when/if post-estimation is valid
mim: A new architecture Main aims • To unify two sets of tools into a single architecture • To combine functionality of both sets of tools • To simplify the command syntax • To extend the range of estimation commands supported • Better post-estimation facilities • testparm, lincom, predict • Make it harder to do crazy things • Add other post-estimation commands later
mim: A new architecture Scope: • Creation of imputations is NOT included • But easy for users to put imputed datasets into mim format • Architecture covers analysis and manipulation of existing imputed datasets • Designed to handle: • Estimation • Data manipulation (reshape, append & merge) • Post-estimation (lincom, testparm & predict) • Replay (management of estimation results) • Utility functions
mim: A new architecture Storage of imputed datasets: • Based on Royston’s stacked format • Fixed names for impid and obsid vars • _mj (impid) and _mi (obsid) • no need for: • dataset characteristics to record the names • additional command options to specify the names • dedicated set command to manage the characteristics • stacking requires only generate, append and replace • Original data stored in the stack • _mj == 0
mim: A new architecture Storage of datasets: illustration _mj _mi y x ---------------------------------- 0 1 1.1 105 0 2 9.2 106 0 3 1.1 . 0 4 2.3 . 0 5 7.5 108 0 6 7.9 . 1 1 1.1 105 1 2 9.2 106 1 3 1.1 109.796 1 4 2.3 110.456 1 5 7.5 108 1 6 7.9 102.243 2 1 1.1 105 2 2 9.2 106 2 3 1.1 107.952 2 4 2.3 115.968 2 5 7.5 108 2 6 7.9 114.479
mim: A new architecture Command structure: • A single command prefix called mim • mim processes the multiply-imputed dataset currently in memory • Typical syntax . mim: command • E.g. . use myImputedData, clear . mim: regress y x1 x2 x3 . mim: predict yhat . mim: lincom x1+x2+x3, or
mim: A new architecture Commands (cont.): • General syntax • Default behaviour of mim may be modified through mim options: mim [, mim_options]: command • mim_options depend on whether one wishes to do • estimation • data manipulation • post-estimation • replay
Using mim Estimation: • mim recognises 28 estimation commands regress mean proportion ratio logistic logit ologit mlogit probit oprobit poisson glm binreg blogit clogit cnreg mvreg rreg qreg iqreg sqreg bsqreg stcox streg xtgee xtreg xtlogit xtmixed • and 11 svy commands svy:regress svy:mean ... svy:poisson • Plus, in principle any Stata estimation command may be used: mim, category(fit): estimation_command
Using mim Data manipulation: • Stacked format allows simple manipulation using existing stata commands: . generate, replace, label etc. . by _mj: tabulate ... • mim recognises 3 data manipulation commands . mim: reshape cmdline . mim: append using “another mim dataset” . mim, sort(varlist) : merge using ... • In principle, any Stata data manipulation command may be used with mim: mim, category(manip) sort(varlist): manip_command
Using mim • mim recognises some post-estimation commands: . mim: lincom cmdline . mim: testparm cmdline . mim: predict xbvar [, eq(name)] . mim: predict sevar, stdp [ eq(name)] • Replay combined estimates: . mim • Replay individual estimates (#th imputed dataset): . mim, j(#)
Using mim • Interactive example in Stata
Final comments • Difficulties faced: • Simplicity of programming versus ease of use and flexibility • Inconsistencies between commands resulted in more tailoring than we’d hoped • Progress • Coding of version 1 complete • Current version is 1.0.3 • Help file written • Has been in beta-testing for several months • Submitted for publication in Stata Journal
