1 / 15

How sensitive are estimates of the marginal propensity to consume to measurement error in survey data in South Africa

How sensitive are estimates of the marginal propensity to consume to measurement error in survey data in South Africa. Reza C. Daniels UCT reza.daniels@uct.ac.za Vimal Ranchhod UCT vimal.ranchhod@gmail.com. Outline. Context Question Econometric problem Proposed solution Data Results

eshe
Download Presentation

How sensitive are estimates of the marginal propensity to consume to measurement error in survey data in South Africa

An Image/Link below is provided (as is) to download presentation Download Policy: Content on the Website is provided to you AS IS for your information and personal use and may not be sold / licensed / shared on other websites without getting consent from its author. Content is provided to you AS IS for your information and personal use only. Download presentation by click this link. While downloading, if for some reason you are not able to download a presentation, the publisher may have deleted the file from their server. During download, if you can't get a presentation, the file might be deleted by the publisher.

E N D

Presentation Transcript


  1. How sensitive are estimates of the marginal propensity to consume to measurement error in survey data in South Africa Reza C. Daniels UCT reza.daniels@uct.ac.za VimalRanchhod UCT vimal.ranchhod@gmail.com

  2. Outline • Context • Question • Econometric problem • Proposed solution • Data • Results • Caveats • Conclusion

  3. Context • Best micro level data in SA for incomes and expenditures comes from StatsSA income and expenditure surveys (ies 95, 00 and 05) • From here, we can estimate the marginal propensity to consume (MPC), i.e. what proportion of every rand of disposable income do households spend. This can be broken up into various categories of expenditure. • The marginal propensity to save (MPS) is defined as 1 – MPC, with corresponding definition.

  4. Context (2) • A common problem in survey data is measurement error in responses. i.e. The data captured might not truly reflect the financial reality being measured. • In the `classical measurement error’ case, this leads to attenuation bias. Estimated relationships are weaker than the true relationships. • For other types of measurement error, even being able to sign this bias may not be possible.

  5. Question • How sensitive are estimates of the MPC to measurement error (m.e.) in the IES data. • We propose to estimate this sensitivity using an instrumental variables approach, with wage data from the same households, but from a different survey, namely the LFS 2000:2, as our candidate instrument.

  6. Econometric Problem • Suppose the “true” relationship is: • Yi = B0 + B1 Xi* + ui, where: • Y is the outcome variable of interest, • X* is the ‘true’ value of the dependent variable, • And u is a mean zero error term. • The subscript i refers to person i, where i=1, …, n • It can be shown that, asymptotically, the OLS estimator of B1 obtained from a regression of Y on X* will be consistent if and only if: • Cov(X* , u) = 0

  7. OLS estimator with measurement error • Suppose that we observe X instead of X*, • Where X = X* + e, E[e]=0, cov(X* , e) = 0 and cov(u, e)=0 • By regressing Y on X, we can show that the probability limit of our estimate of B1 from an OLS regression = B1 + cov(X, u-B1e)/Var(X) = B1 – B1 (Var(e)/[Var(X*) + Var(e)]) This is known as attenuation bias. • In essence, regardless of the type of m.e. we are considering, the crucial question to ask is whether or not the covariance between the observed X and the composite error term is zero.

  8. M.E: An IV solution • Suppose we had another variable, Z, which is: • Correlated with our observed X, and • Uncorrelated with the composite error term, v=(u-B1e) Then Z would provide a valid instrument for the endogenous regressor X. In particular, another noisy measure of X* , eg. Z=X* + k would suffice, if k is uncorrelated with both u and e.

  9. Asymptotically plimBhat1,IV = B1 + (corr(Z,v)/corr(Z,X1))*(var(v)/var(X1))0.5 (Recall that v=(u-B1e)) Now, var(v) ≠0, var(X1)≠0 and corr(Z,X1)≠0, therefore the IV works iffcorr(Z,v)=0. i.ecorr(X1* + k, u-B1e)=0, So the crucial requirement is that k and e are uncorrelated.

  10. Implementing the solution • We match data on individuals from the IES 2000 and LFS 2000:2. • The data were obtained in October and September respectively. • IES contains more detailed information on multiple sources of income and categories of expenditure, expenditure at HH level. • LFS contains information on employment status and wage income.

  11. Summarizing the Data

  12. OLS and IV coefficients

  13. Caveats • Sensitive to imputation method of wage data from categories. • Conceptual difficulties on how to treat debt financing and dissaving or borrowing. • IVs are fairly weak, many HH’s get income from grants. • If m.e. correlated with income levels, eg. Rich HHs always understate, then its not clear that the solution is valid. • Non-response also not accounted for.

  14. Conclusion • Promising avenue of investigation • IV’s do have significant first stages • Lots more to be done … • Do by income quintile, • And by age of HH head, or some form of HH composition.

More Related