Implementation of a double-hurdle model Bruno Garcia The Stata Journal (2013), 13, Number 4, pp....
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Transcript of Implementation of a double-hurdle model Bruno Garcia The Stata Journal (2013), 13, Number 4, pp....
Implementation of a double-hurdle model
Bruno Garcia
The Stata Journal (2013), 13, Number 4, pp. 776-794
Presented by Gulzat
The paper is about
• A double hurdle model (DHM) (Cragg, 1971 Econometrica 39: 829-844)
• What is new: Stata command dblhurdle (and predict after dblhurdle )
Censored dependent variable models
• E.g. Consumer or not if a consumer the value of the expenditure is known
• Tobit: assumes that the factors explaining of becoming a consumer and how much to spend have the same effect on these two decisions
• DHM: allows these effects to differ
Tobit Model
• andTwo variables and one model to explain these two variables
Double Hurdle Model
1. Potential consumer or not, D is not observed
• 2. • >0• (or or () )• • , )= unobserved elements effecting consumers/nonconsumers
may affect amount of expenditure• Individuals make decisions in two steps
Double Hurdle Model (following the paper.....)
• Decision 1: participation • Decision 2: quantity (maybe zero)• =the observed consumption of an individual,
dependent variable continous over positive values, but
Double Hurdle Model
• The log liklihood function for the DHM ():
•
Double Hurdle Model
• models the quantity equation• models the participation equation• The command estimates where • Restriction:
Double Hurdle Model: Stata
Double Hurdle Model
Example: The use of the dblhurdle command using smoke.dta from Wooldridge (2010).
Marginal effects
• The number of years of schooling (educ) on:1. The probability of smoking2. The expected number of cigarettes smoked given that you smoke3. The expected number of cigarettes smoked
Prediction
• ppar - the probability of being away from the corner conditional on the covariates:
• ycond - expectation:
• yexpected - expected value of y conditional on x and z:
Marginal effects
Marginal effects
Marginal effects
Monte Carlo simulation: Finite sample properties of the estimator
• Three measures of performance:• The mean of the estimated parameters should
be close to their true values.• The mean standard error of the estimated
parameters over the repetitions should be close to the standard deviation of the point estimates.
• The rejection rate of hypothesis tests should be close to the nominal size of the test.
Monte Carlo simulation
The data-generating process can be summarized as follows:
Monte Carlo simulation
• A dataset of 2,000 observations was created. • The x’s were drawn from a standard normal distribution, and
the d’s were drawn from a Bernoulli with p = 1/2. • Refer to this dataset as “base”.• Iteration of the simulation:1. Use “base”.2. For each observation, draw (gen) from a standard normal.3. For each observation, draw (gen) u from a standard normal.4. For each observation, compute y according to the data-generating process presented above.5. Fit the model, and save the values of interest with post.
Monte Carlo simulation
Monte Carlo simulation
• A less intuitive issue: The set of regressors in the participation equation=the set of regressors of the quantity equation.
• The model is weakly identified. • The data-generating process:
Monte Carlo simulation
Conclusion
• Researchers may consider dblhurdle when using tobit model
• Its flexibility allows the researcher to break down the modeled quantity along two useful dimensions, the “quantity” dimension and the “participation” dimension
• The command presented in this article only allows for a single corner in the data
• One desirable feature to add is the capability to handle dependent variables with two corners