Projects per year
Abstract
BACKGROUND: Chained equations imputation is widely used in medical research. It uses a set of conditional models, so is more flexible than joint modelling imputation for the imputation of different types of variables (e.g. binary, ordinal or unordered categorical). However, chained equations imputation does not correspond to drawing from a joint distribution when the conditional models are incompatible. Concurrently with our work, other authors have shown the equivalence of the two imputation methods in finite samples.
METHODS: Taking a different approach, we prove, in finite samples, sufficient conditions for chained equations and joint modelling to yield imputations from the same predictive distribution. Further, we apply this proof in four specific cases and conduct a simulation study which explores the consequences when the conditional models are compatible but the conditions otherwise are not satisfied.
RESULTS: We provide an additional "non-informative margins" condition which, together with compatibility, is sufficient. We show that the non-informative margins condition is not satisfied, despite compatible conditional models, in a situation as simple as two continuous variables and one binary variable. Our simulation study demonstrates that as a consequence of this violation order effects can occur; that is, systematic differences depending upon the ordering of the variables in the chained equations algorithm. However, the order effects appear to be small, especially when associations between variables are weak.
CONCLUSIONS: Since chained equations is typically used in medical research for datasets with different types of variables, researchers must be aware that order effects are likely to be ubiquitous, but our results suggest they may be small enough to be negligible.
Original language | English |
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Article number | 28 |
Pages (from-to) | 28 |
Number of pages | 10 |
Journal | BMC Medical Research Methodology |
Volume | 14 |
DOIs | |
Publication status | Published - 21 Feb 2014 |
Keywords
- Chained equations imputation
- Gibbs sampling
- Joint modelling imputation
- Multiple imputation
- Multivariate missing data
- DISCRETE CONDITIONAL DISTRIBUTIONS
- MULTIPLE IMPUTATION
- MULTIVARIATE IMPUTATION
- CHECKING COMPATIBILITY
- SPECIFICATION
Fingerprint
Dive into the research topics of 'Joint modelling rationale for chained equations'. Together they form a unique fingerprint.Projects
- 3 Finished
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Developing and disseminating robust methods for handling missing data in epidemiological studies
Tilling, K. M. (Principal Investigator)
1/04/10 → 1/10/13
Project: Research
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COLLABORATION AND INNOVATION IN DIFFICULT OR RANDOMISED CONTROLLED TRIALS
Blazeby, J. (Principal Investigator)
1/04/09 → 1/04/14
Project: Research
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DEALING WITH MISSING DATA IN LONGITUDINAL STUDIES
Sterne, J. A. C. (Principal Investigator)
1/10/06 → 1/10/08
Project: Research
Profiles
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Dr Rach Hughes
- Bristol Medical School (PHS) - Senior Research Fellow
- Bristol Population Health Science Institute
Person: Academic , Member