Dears,
I have a question about model specification that I wonder if people can share their thoughts about it (by the way, apologies if this is not the place to ask this question, in that case I'll appreciate if someone can suggest me a more appropriate forum). I am estimating a model using a longitudinal dataset at the individual level. The policy, Xst, (bankruptcy protection in USD values) is implemented at the state level, since each state changes the level of protection at different times and by different amounts. I want to evaluate its effect on an outcome (stock ownership, Yist) measured at the individual level. Thus, I estimate the model using state and individual fixed-effects:
Y,ist = beta,t + beta,s + beta,i + Xs,t + state and individual controls,ist + epsilon,ist
Since I'm using a nonlinear specification (actually is a cubic spline, so it's not reflected in the equation above but I think it doesn't matter for the point I want to make), I'd like to do a placebo test to show that my results are not purely driven by the flexibility of the functional form I've chosen. I've seen that in program evaluation sometimes people use a dynamic model where they include leads and lags of the treatment variable. If the program is indeed causing the effects in the outcome, then the leads should not be significant (otherwise they will capture anticipatory effects or pre-existing trends), whereas the lags will capture short/long term effects.
I wonder if in my setting that is not program evaluation (ie my treatment is not a dummy before and after the policy was implemented), that approach would still be valid. Since fixed-effect models can be seen as a generalization of diff-in-diffs with more than 2 periods and 2 groups (http://web.mit.edu/14.771/www/emp_handout.pdf), I thought I could use a similar placebo test as the ones used in DD. Alternatively, is there a better approach to do a placebo test or is there an argument for why such kind of test shouldn't be necessary/appropriate in this context?
Well, any comments about this will be appreciated!
Thanks,
Mariela
I have a question about model specification that I wonder if people can share their thoughts about it (by the way, apologies if this is not the place to ask this question, in that case I'll appreciate if someone can suggest me a more appropriate forum). I am estimating a model using a longitudinal dataset at the individual level. The policy, Xst, (bankruptcy protection in USD values) is implemented at the state level, since each state changes the level of protection at different times and by different amounts. I want to evaluate its effect on an outcome (stock ownership, Yist) measured at the individual level. Thus, I estimate the model using state and individual fixed-effects:
Y,ist = beta,t + beta,s + beta,i + Xs,t + state and individual controls,ist + epsilon,ist
Since I'm using a nonlinear specification (actually is a cubic spline, so it's not reflected in the equation above but I think it doesn't matter for the point I want to make), I'd like to do a placebo test to show that my results are not purely driven by the flexibility of the functional form I've chosen. I've seen that in program evaluation sometimes people use a dynamic model where they include leads and lags of the treatment variable. If the program is indeed causing the effects in the outcome, then the leads should not be significant (otherwise they will capture anticipatory effects or pre-existing trends), whereas the lags will capture short/long term effects.
I wonder if in my setting that is not program evaluation (ie my treatment is not a dummy before and after the policy was implemented), that approach would still be valid. Since fixed-effect models can be seen as a generalization of diff-in-diffs with more than 2 periods and 2 groups (http://web.mit.edu/14.771/www/emp_handout.pdf), I thought I could use a similar placebo test as the ones used in DD. Alternatively, is there a better approach to do a placebo test or is there an argument for why such kind of test shouldn't be necessary/appropriate in this context?
Well, any comments about this will be appreciated!
Thanks,
Mariela
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