I am currently working on a random intercept multilevel model using the European Social Survey round 6 dataset. It is a 2-level model with individuals (level 1) nested within countries (level 2). To simplify things, imagine the following regression: $Y_{ij}=\beta_{0j}+\beta_{1j}X_{ij}+e_{ij}$ where the dependent variable is **trust in the European Parliament** on a scale from 0-10, and the level-1 predictor is **gender**. In the data set, there exists two weights: - _Design weight_: The design weights are inclusion probabilities for individuals $i$ in countries $j$. The design weight corrects for slightly different probabilities of selection, thereby making the sample more representative of a ‘true’ sample of individuals from each country. - _Population size weights_: The population size weight makes an adjustment to ensure that each country is represented in proportion to its population size. The population size weight is calculated as PWEIGHT= [Population size]/[(Net sample size in data file)*10 000] My question is: do I need to specify the population size weights when I run the multilevel model? I tend to get different results. Below is the regression with design weights apllied (I am using Stata): . xtmixed trstep gndr [pw = dweight]|| land:, mle var Obtaining starting values by EM: Performing gradient-based optimization: Iteration 0: log pseudolikelihood = -92442,22 Iteration 1: log pseudolikelihood = -92442,22 (backed up) Computing standard errors: Mixed-effects regression Number of obs = 39923 Group variable: land Number of groups = 24 Obs per group: min = 579 avg = 1663,5 max = 2711 Wald chi2(1) = 5,91 Log pseudolikelihood = -92442,22 Prob > chi2 = 0,0151 (Std. Err. adjusted for 24 clusters in land) ------------------------------------------------------------------------------ | Robust trstep | Coef. Std. Err. z P>|z| [95% Conf. Interval] -------------+---------------------------------------------------------------- gndr | ,1147821 ,0472334 2,43 0,015 ,0222063 ,2073578 _cons | 4,144926 ,117911 35,15 0,000 3,913825 4,376027 ------------------------------------------------------------------------------ ------------------------------------------------------------------------------ | Robust Random-effects Parameters | Estimate Std. Err. [95% Conf. Interval] -----------------------------+------------------------------------------------ land: Identity | var(_cons) | ,3184852 ,0689119 ,2084065 ,4867066 -----------------------------+------------------------------------------------ var(Residual) | 5,93535 ,2514202 5,462477 6,449158 ------------------------------------------------------------------------------ And here is the regression with both design weights, population size weights and scaling applied: . xtmixed trstep gndr [pw = dweight]|| land:, mle var pweight(pweight) pwscale(size) Obtaining starting values by EM: Performing gradient-based optimization: Iteration 0: log pseudolikelihood = -81334,099 Iteration 1: log pseudolikelihood = -81333,24 Iteration 2: log pseudolikelihood = -81333,24 Computing standard errors: Mixed-effects regression Number of obs = 39923 Group variable: land Number of groups = 24 Obs per group: min = 579 avg = 1663,5 max = 2711 Wald chi2(1) = 10,73 Log pseudolikelihood = -81333,24 Prob > chi2 = 0,0011 (Std. Err. adjusted for 24 clusters in land) ------------------------------------------------------------------------------ | Robust trstep | Coef. Std. Err. z P>|z| [95% Conf. Interval] -------------+---------------------------------------------------------------- gndr | ,1680609 ,0513105 3,28 0,001 ,0674942 ,2686276 _cons | 3,745146 ,1854299 20,20 0,000 3,38171 4,108582 ------------------------------------------------------------------------------ ------------------------------------------------------------------------------ | Robust Random-effects Parameters | Estimate Std. Err. [95% Conf. Interval] -----------------------------+------------------------------------------------ land: Identity | var(_cons) | ,2645594 ,0598105 ,1698583 ,412059 -----------------------------+------------------------------------------------ var(Residual) | 6,070198 ,3532338 5,415894 6,803549 ------------------------------------------------------------------------------ I can't figure out how the population weights influence the ML estimates. The official ESS documentation says: > When comparing data from two or more countries but without reference > to the average (or combined total) of those countries, only the design > weight need be applied. When comparing data of two or more countries > and with reference to the average (or combined total) of those > countries, both design and population size weights should be applied. ([ESS Documentation][1]) The question is, whether I actually just compare countries, or compare them to an overall mean. The latter seems to be correct, as the parameter estimates actually relate to the overall mean $\mu_{00}$. But I may be wrong. The Stata manual has an extensive section on weighting [here][2] but it did not clear things up for me. Any suggestions? [1]: http://www.europeansocialsurvey.org/docs/methodology/ESS_weighting_data.pdf [2]: http://www.stata.com/bookstore/stata12/pdf/xt_xtmixed.pdf#page=41