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The Great Divide: fixed vs. random effects in an education context. Claire Crawford with Paul Clarke, Fiona Steele & Anna Vignoles and funding from ESRC ALSPAC Large Grant. Introduction I. Our strand concerned with determinants of educational achievement
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The Great Divide: fixed vs. random effects in an education context Claire Crawford with Paul Clarke, Fiona Steele & Anna Vignoles and funding from ESRC ALSPAC Large Grant
Introduction I • Our strand concerned with determinants of educational achievement • Number of substantive research questions: • Impact of SEN • Impact of school size • Joint determination of cognitive and non-cognitive skills (ECM agenda)
Introduction II • Thinking about appropriate models • Pupils clustered within schools → hierarchical models • Two popular choices: fixed and random effects • Which approach is best in which context? • Idea is always to move closer to a causal interpretation • Choice of model: • Often driven by discipline tradition • May depend on whether primary interest is pupil or school characteristics
Outline of talk • Why SEN? • Fixed and random effects models in the context of our empirical question • Data and results • Tentative conclusions
Introduction to SEN • One in four Y6 pupils in England identified as SEN • With statement (more severe): 3.7% • Without statement (less severe): 22.3% • SEN label means different things in different schools and for different pupils • Maximum means special school or full time teaching assistant (i.e. additional resources) • Minimum means close monitoring or annual review • Recognition that SEN is not a “treatment”
Why adjust for school effects? • Want to estimate causal effect of SEN on pupil attainment no matter what school they attend • Need to adjust for school differences in SEN labelling • e.g. children with moderate difficulties more likely to be labelled SEN in a high achieving school than in a low achieving school (Keslair et al, 2008; Ofsted, 2004) • May also be differences due to unobserved factors • Hierarchical models can account for such differences • Fixed or random school effects?
Fixed effects vs. random effects • Long debate: • Economists tend to use FE models • Educationalists tend to use RE/multi-level models • But choice must be context and data specific
Basic model • FE: us is school dummy variable coefficient • RE: us is school level residual • Additional assumption required: E [us|Xis] = 0 • That is, no correlation between unobserved school characteristics and observed pupil characteristics • Both: both models assume: E [eis|Xis] = 0 • That is, no correlation between unobserved pupil characteristics and observed pupil characteristics
Relationship between FE, RE and OLS FE: RE: Where:
How to choose between FE and RE • Very important to consider sources of bias: • Is RE assumption (i.e. E [us|Xis] = 0) likely to hold? • Other issues: • Number of clusters • Sample size within clusters • Rich vs. sparse covariates • Whether variation is within or between clusters • What is the real world consequence of choosing the wrong model?
Sources of selection • Probability of being SEN may depend on: • Observed school characteristics • e.g. ability distribution, FSM distribution • Unobserved school characteristics • e.g. values/motivation of SEN coordinator • Observed pupil characteristics • e.g. prior ability, FSM status • Unobserved pupil characteristics • e.g. education values and/or motivation of parents
Intuition I • If probability of being labelled SEN depends ONLY on observed school characteristics: • e.g. schools with high FSM/low achieving intake are more or less likely to label a child SEN • Random effects appropriate as RE assumption holds (i.e. unobserved school effects are not correlated with probability of being SEN)
Intuition 2 • If probability of being labelled SEN also depends on unobserved school characteristics: • e.g. SEN coordinate tries to label as many kids SEN as possible, because they attract additional resources; • Random effects inappropriate as RE assumption fails (i.e. unobserved school effects are correlated with probability of being SEN) • FE accounts for these unobserved school characteristics, so is more appropriate • Identifies impact of SEN on attainment within schools rather than between schools
Intuition 3 • If probability of being labelled SEN depends on unobserved pupil/parent characteristics: • e.g. some parents may push harder for the label and accompanying additional resources; • alternatively, some parents may not countenance the idea of their kid being labelled SEN • Neither FE nor RE will address the endogeneity problem: • Need to resort to other methods, e.g. IV
Other considerations • RE model may be favoured over FE where: • Number of clusters is large • e.g. ALSPAC vs. NPD • Most variation is between clusters • e.g. UK (between) vs. Sweden (within) • Have rich covariates
Can tests help? • Hausman test: • Commonly used to test the RE assumption • i.e. E [us|Xis] = 0 • But really testing for differences between FE and RE coefficients • Over-interpretation, as coefficients could be different due to other forms of model misspecification and sample size considerations (Fielding, 2004) • Test also assumes: E [πis|Xis] = 0
Data • Avon Longitudinal Study of Parents and Children (ALSPAC) • Recruited pregnant women in Avon with due dates between April 1991 and December 1992 • Followed these mothers and their children over time, collecting a wealth of information: • Family background (including education, income, etc) • Medical and genetic information • Clinic testing of cognitive and non-cognitive skills • Linked to National Pupil Database
Looking at SEN in ALSPAC • Why is ALSPAC good for looking at this issue? • Availability of many usually unobserved individual and school characteristics: • e.g. enjoyment of school, education values of parents, headteacher tenure • In particular: • IQ (measured by clinicians) • Good measures of non-cognitive skills (including behavioural difficulties) reported by parents/teachers
Descriptive statistics • 18% of sample are SEN at age 10 Notes: relationship between selected individual and school characteristics and SEN status. Omitted categories are: mum’s highest qualification is CSE level; head teacher tenure < 1 year.
Impact of SEN: full model • OLS, RE and FE don’t give qualitatively different answers to question of impact of SEN on KS2 APS • Hausman test suggests no difference between FE and RE Note: model also controls for vast array of other individual and school characteristics (where appropriate).
Impact of SEN: NPD only Note: model also controls for limited other individual and school characteristics (where appropriate). • Again OLS, RE and FE don’t give qualitatively different coefficients on SEN • But global Hausman test suggests FE and RE are NOT equivalent • May be because there is correlation between SEN and unobserved individual characteristics? • SEN coefficients about 0.1 SDs higher than in full model
Impact of SEN: girls only • Despite halving sample size, OLS, RE and FE again don’t give qualitatively different coefficients on SEN • But Hausman test suggests FE and RE are NOT equivalent Note: model also controls for vast array of other individual and school characteristics (where appropriate).
Summary • SEN appears to be strongly negatively with progress between KS1 and KS2 • SEN pupils score around 0.5 SDs lower • Choice of model does not seem to matter here • OLS, FE and RE all give qualitatively similar results • Suggests correlation between probability of being SEN and unobserved school characteristics is not important • But doesn’t mean we don’t have to worry about selection on unobserved individual characteristics
Still to come . . . • More detailed investigation of conditions under which FE and RE are equivalent • Simulation study • Do effects of SEN differ across schools?
Tentative conclusions • Approach each problem with agnostic view on model • Should be determined by theory and data, not tradition • In reality, choice may not make very much difference • Can our results be generalised? • Different questions? Different data? • Worth remembering that neither FE nor RE deals with correlation between observed and unobserved individual characteristics