Dealing with Household Non-response using Generalised Calibration – a simulation

Guillaume OsierInstitut National de la Statistique et des Etudes Economiques (STATEC)Social Statistics DivisionGuillaume.Osier@statec.etat.lu Dealing with Household Non-response using Generalised Calibration – a simulation Task Force on Victimization Eurostat, 14-15 February 2012

The generalised calibration • We seek to determine new weights function of the design weights and a vector z of non-response variables: • F is a « calibration » function and z is a vector of non-response explanatory variables • The vector  is determined by solving the calibration quations based on a vector x of calibration variables: 2

Objective of the simulation • To test out the generalised calibration as a method for reducing non-responsebias, particularlywhennon-responseisnon-ignorable, thatis, when the non-responsemechanismdependson variables of interest measured within the same survey and observed for only the responding units • Weused the Household Budget Survey (HBS) data for Luxembourg: the population comprisedall the householdswhichparticipated to the surveyat least once between2005 and 2010 nearly 8000 households

S1* 1. Bias 2. Variance 3. Mean Square Error (MSE) S2* … SK* 3. Estimation of the targetparameter(meanconsumtionexpenditure per household) fromeachreplication 2. Selection of K=2000 replications according to a non-ignorable response mechanism (mimic HBS) 1. All the hhswhichparticipatedat least once to the HBS in 2005-2010 ( 8000)

Whenestimating the targetparameter, this simulation offered an opportunity to test differentweightingstrategies, including the generalised calibration

Construction of a non-ignorableresponsemechanism–1/2 • Non-responseisdescribed by a logistic model basedon: • Age, gender and citizenship of the household’sreferenceperson(observed for both the respondents and the non-respondents) • Log of the householdtotal expenditure(observed for only the respondents) • To estimate the model parameters, the explanatory variables must be known both for the respondents and the non-respondents  need to impute expenditure values to the non-respondents first

Construction of a non-ignorableresponsemechanism–2/2 • Weassumeda log-normal distribution of household total expenditure, withdifferentmeanparametersm and m* for the respondents and the non-respondentsrespectively • m* > m on average, non-respondinghouseholds have higherexpenditurethanrespondinghouseholds • Thus, by using the log of the householdexpenditure in the model (observed for the respondents, imputed for the non-respondents), weconstruct a response model in which the higher the expenditure, the lower the probability

Weighting strategies – 1/4 1. The classical strategies • Division by the global response rate calculated from the sample observations • One-step calibration using household size, age, gender and citizenship of the household’s reference person 2. Generalised Calibration • Non-response variables: household size, age, gender and citizenship of the household’s reference person + household total expenditure • Calibration variables: household size, age, gender and citizenship of the household’s reference person + one more variable

Weightingstrategies–2/4 • In order to have the generalised calibration equation identifiable, weneed as many non-response variables as calibration variables • Thus, if weaddhouseholdexpenditure as a non-response variable, we must alsoadd one more calibration variable to the system • Wesimulated an additional calibration variable having a givencorrelationwithhouseholdexpenditure. As we’llseenext, the results of the simulation are stronglyaffected by the value of 

Weightingstrategies – 3/4 • Several calibration variables werecreatedeachhaving a fixed in advancecorrelationwith the household total expenditure (denotedx):

Weightingstrategies – 4/4 • Wealsotestedwhatwouldhappen if non-responsewas in factignorable, thatis, the non-responsemechanismdoesnotdepend on the variable of interest scenario in whichwewrongly assume non-ignorability • Finally, wetestedwhatwouldbe the result if wechanged the functionalform in the calibratedweights (functionF of the calibration equation): • Linear • Raking ratio • Logistic ( LO = 0.1 and UP = 30 )

The macro Calmar2 • New version of the SAS macro Calmar developed by France’s Statistics Office (INSEE) to calculate calibrated weights to external data sources • Can implement very easily the generalised calibration technique: • The macro was used as a software tool to calculate the weights in the simulation • The generalised calibration is also implemented in the software R (package ‘sampling’, function ‘gencalib’)

Results (Non-ignorable) – Relative Bias (%)

Results (Non-ignorable) – Variance

Results (Non-ignorable) – MSE

Results (Ignorable) – Relative Bias (%)

Results (Ignorable) – Variance

Results (Ignorable) – MSE

Conclusion –1/2 • According to this simulation, assumingthat non-responseis non-ignorable, the generalised calibration approach has ledtoward a substantialreduction of the non-responsebias • In the same time, the lower the correlationbetween the additional calibration variable and the household total expenditure, the higherthe sampling variance  « bounded » methods (logistic) betterbeused • When the biasissubstantiallyreduced, the Mean Square Error (MSE) isreduced as well, unless the loss in samplingprecisionistoo high (nearzero)

Conclusion –2/2 • When we apply the generalised calibration to an ignorable non-response mechanism: • The bias appears to remain stable • The sampling variance increases as well as Mean Square Error (MSE) lower accuracy • Because of this, generalised calibration should be used only if we have strong convictions that non-response is caused by variables of interest of the survey, for which the values are only observed on the respondents. In the absence of any information on the non-respondents which could help check this assumption, we have no other choice but to « trust » it

Dealing with Household Non-response using Generalised Calibration – a simulation