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Is the Propensity Score an Inferior Version of Instrumental Variables?

Is the Propensity Score an Inferior Version of Instrumental Variables?. International Health Economics Association. Contributors. William H. Crown, PhD Medstat Onur Baser, PhD Medstat Ernst R. Berndt, PhD Massachusetts Institute of Technology,

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Is the Propensity Score an Inferior Version of Instrumental Variables?

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  1. Is the Propensity Score an Inferior Version of Instrumental Variables? International Health Economics Association

  2. Contributors • William H. Crown, PhD Medstat • Onur Baser, PhD Medstat • Ernst R. Berndt, PhD Massachusetts Institute of Technology, Sloan School of Management, and National Bureau of Economic Research

  3. Overview • What do we mean by bias? • Propensity score • Instrumental variables • The Identification issue • Empirical example • Conclusions

  4. Estimating Treatment Effects • For any given individual, an outcome can be measured as: Y=DY1+(1-D)Y0 Where D=1 if treated D=0 if not treated And Y1=outcome for treated Y0=outcome for not treated • Treatment effects are measured as: • E(Y1-Y0)

  5. Econometric Approach Evaluation problem leads to switching regime model of Quandt (1972): Y1=g1(x)+u1 Y0=g0(x)+u0 Where: E(u1|x)=0 E(u0|x)=0

  6. The Usual Estimate E(Y1-Y0|X, D=1) =g1(x)-g0(x)+E(u1-u0|x,D=1) This quantity is the “mean effect of treatment on the treated”

  7. Sources of bias in treatment effects estimated from observational data • Treated patients and controls can have different distributions on observed variables • Outcomes and explanatory variables may not be measured in the same way for both groups • Treated patients and controls may be in different environments that affect their behavior • Treated patients and controls may have different distributions on unobserved variables

  8. What matters most? • Controlling for observable variables (1-3) is most important empirically • Nevertheless, bias from unobservables is still large relative to randomized experiments Heckman, Ichimura, Todd. Matching as an econometric evaluation estimator: Evidence from evaluating a job training programme. Review of Economic Studies, 64:605-654, 1997.

  9. Propensity Score Methods: An Overview

  10. Three main methods • Matching • Stratification • Regression D’Agostino. 1998. Tutorial in biostatistics: Propensity score methods for bias reduction in the comparison of a treatment to a non-randomized control group. Statistics in Medicine, 17: 2265-2281

  11. Empirical Implementation: Matching • Model probability of treatment as a function of observable variables • Match participants with controls • Nearest neighbor • Mahalanobis metric matching • Nearest Mahalanobis metric matching with calipers

  12. Empirical Implementation: Stratification • Model probability of treatment as a function of observable variables • Propensity scores are grouped into strata • Treated patients and controls are compared within strata Five strata generally sufficient to remove 90% or more of bias from differences in distributions of observable variables (Rosenbaum and Rubin , 1984)

  13. Empirical Implementation: Regression • Model probability of treatment as a function of observable variables • Include estimated propensity score in outcome equation as an additional covariate • Sometimes broader set of variables used for propensity score and narrower set for outcome equation

  14. Simulations of Alternative Propensity Score Methods

  15. Background • Overall Prescription Drug Use • Rising prescription drug expenditures • Health plans have attempted to control rising prescription drug costs by changing cost sharing provisions • Asthma-Specific Prescription Drug Use • Asthma “controller” medications underutilized • Increases in controller-to-reliever ratio are beneficial • Co-payments also used to create incentives for appropriate healthcare use

  16. Overview of Asthma Medications • Controller Medications • taken daily on a long-term basis to achieve and maintain control of persistent asthma • Daily: Long-Term Control • Corticosteroids (inhaled and systemic) • Cromolyn/nedocromil • Long-acting beta2-agonists • Methylxanthines • Leukotriene modifiers Source: National Asthma Education and Prevention Program, NHLBI, (1997)

  17. Overview of Asthma Medications • Reliever or acute rescue medications • quick-relief medications taken to provide prompt reversal of acute airflow obstruction and relief of accompanying bronchoconstriction • As-needed: Quick Relief • Short-acting beta2-agonists • Anticholinergics • Systemic corticosteroids Source: National Asthma Education and Prevention Program, NHLBI, (1997)

  18. Methods • Data source: • 1995–2000 MarketScan files (a large database of private sector inpatient, outpatient, and prescription drug medical claims) • Area Resource File for county-level race and income information

  19. Study Sample • Enrolled in a participating health plan during at least two of the years 1995-2000 • Patients with evidence of asthma • Identified by diagnosis for asthma on patient claims or prescriptions

  20. Measures • Plan type • Fee-for-service (FFS) versus non-FFS plans • Co-payments • Out of pocket payments for asthma drugs by therapeutic class for each plan • Out of pocket payments for emergency room visits, outpatient visits, and hospitalizations for each plan • Co-morbidities • Counts of unique ICD-9 diagnosis codes, flags for specific comorbidities commonly found with asthma • Utilization • claims and encounters over the study period

  21. Analytic Approach • Bootstrap estimates of alternative propensity score approaches • Matching • Stratification • Regression • Standard errors based on 100 replications

  22. Propensity Score Matching Results

  23. Propensity Score Stratification Results

  24. Propensity Score Regression Results

  25. Instrumental Variables: Preferable to Propensity Scores?

  26. The Problem Y=B0+B1X1+B2X2+…+BkXk+Bk+1Xk+1+u E(u)=0 Cov(Xj,u)=0 for j=1,…k But Cov(Xk+1,u) is not equal to 0 Therefore Xk+1 is “endogenous”

  27. Sources of endogeneity • Omitted variables • Measurement error • Simultaneity

  28. Sample selection bias • Sample selection bias is a special case of missing variables. • If an unobserved variable Xk+1 is correlated with the treatment variable Xk then Xk is endogenous to Xk+1

  29. The IV approach • We need to find an observable variable Z not in the outcome equation that satisfies two conditions: • Cov(Z,u)=0 •  is not =0 Where  is the partial correlation between Z and Xk From the reduced form equation: Xk=C0+C1X1+C2X2+…Ck-1Xk-1+ Z+ê

  30. IV Estimation to Control for Selection Bias • Estimate the probability of treatment as a function of all exogenous variables—including those that are associated only with treatment and not with outcomes. • Substitute this reduced form (predicted probability of treatment) into structural model for outcomes. • This becomes reduced form for outcomes.

  31. Identification • If there is exactly one instrumental variable for treatment, it is possible to solve for the structural parameter of the effect of treatment on outcomes. This is known as exact identification. • If there is more than one instrumental variable for treatment, the outcome equation is over-identified.

  32. IV versus Propensity Score • Both methods start with estimating probability of treatment as a function of exogenous variables. • IV adds explicit criteria of identification • IV also adds standard error adjustment in outcomes equation to recognize that IV is an estimated variable.

  33. Some Possible Instruments • Copays—stratification by year, then plan, then controller and reliever variables. Calculate mean copays for each class of drug by plan. Calculate ratio. • Prescribing %--stratification by year, then tax ID, then patients getting controller, reliever, and combination therapy. Calculate % distribution of asthma prescriptions within tax ID. Sums to 100% so leave one out of model.

  34. Results of Comparisons of IV and Propensity Score Methods

  35. Where Does This Leave Us? • Some of the concepts from IV can be usefully combined with propensity score methods—particularly the concept of exclusionary variables • Regardless of approach used, propensity score methods adjust for observable variables only. • IV compares favorably to Mahalanobis matching with calipers.

  36. Combination methods • Heckman et al (1997) argue for the use of propensity score matching, coupled with differences in differences methods to correct for selection bias. • This method is attractive when the outcome variable is observed at baseline and at the end of the study period for both study participants and controls.

  37. Summary (1) • Propensity score methods can be effective in controlling bias from observable variables. This is often the lion’s share of the bias (i.e., 80% or more). • If distributions of propensity scores are not comparable for treated and untreated groups, however, inferences must be confined to range where they are comparable.

  38. Summary (2) • IV methods appear to generate results similar to Mahalanobis matching with calipers and control for both observable and unobservable variables. Also provide standard error correction on estimated variable. • However, it is valuable to match even if only to understand the overlap of distributions in comparison groups • Application of techniques like differences in differences to matched observations are a non-parametric alternative to IV for removing bias from unobservable variables as well as sources of bias from observable variables

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