Hello,
I'm currently trying to investigate the effect of aging on economic output and what the role of the low interest rates experienced over the past decade are. I use panel data for 169 countries from 1990-2014. I'm currently regressing the following;
yi,t = gdp per capita
Ai = A dummy which equals 1 if the ratio of old (age 65+) to young (age 20-64) has gone up over the period 1990-2014 in a specific country
Li = A dummy which equals 1 if the country has experienced low interest rates over the period
Xi,t = Additional controls
First sum is a set of country dummies.
Second sum is a set of year dummies
ui,t is an error term
i) I've included year dummies to account for secular changes that are not being modeled (these are as i understand aggregate/global changes and not country specific).
ii) I've included country dummies to allow for each and every country to differ. This resembles the Least Sqaure Dummy Variable regression, which is another way of doing a fixed effect estimation. In other words this should remove any country specific fixed (time invariant) effects.
iii) The frist part of the regression (β1 ... β4) is thought to be a dif-in-dif approach.
iiii) Xi,t are control variables for things that are thought to change over time on country level
I have a three questions:
1) Is it okay to combine an dif-in-dif approach with a LSDV regression?
2) The first part of the regression resembles a dif-in-din estimator, however, as countries do not hit the lower zero bound for the nominal interest at the same time I do not have a specific period in which countries go from 'normal' interest rates to low (dif-in-dif usually investigate the effect of a treatment that occurs at a specific time). Most countries did indeed experience low interest rates after the financial crisis of 2008. Should i use this year as a dividing point, or is this not necessary?
3) Some of the underlying independent variables may be endogenous. That is, the aging variable I use to define my dummy may be endogenous as gdp growth may lead to a larger share of old people as it could increase life expectancy, or it could increase the inflow of immigrants seeking job etc. Is it possible to use instrumental variables in this setting. An instrument for the aging variable would be birthrates from fx 1960-1980. This would purge the variable from the before mentioned endogeneity, but I'm not sure how to incorporate this when I'm actually regressing dummy variables.
I hope you can help
/Tobias
I'm currently trying to investigate the effect of aging on economic output and what the role of the low interest rates experienced over the past decade are. I use panel data for 169 countries from 1990-2014. I'm currently regressing the following;
Ai = A dummy which equals 1 if the ratio of old (age 65+) to young (age 20-64) has gone up over the period 1990-2014 in a specific country
Li = A dummy which equals 1 if the country has experienced low interest rates over the period
Xi,t = Additional controls
First sum is a set of country dummies.
Second sum is a set of year dummies
ui,t is an error term
i) I've included year dummies to account for secular changes that are not being modeled (these are as i understand aggregate/global changes and not country specific).
ii) I've included country dummies to allow for each and every country to differ. This resembles the Least Sqaure Dummy Variable regression, which is another way of doing a fixed effect estimation. In other words this should remove any country specific fixed (time invariant) effects.
iii) The frist part of the regression (β1 ... β4) is thought to be a dif-in-dif approach.
iiii) Xi,t are control variables for things that are thought to change over time on country level
I have a three questions:
1) Is it okay to combine an dif-in-dif approach with a LSDV regression?
2) The first part of the regression resembles a dif-in-din estimator, however, as countries do not hit the lower zero bound for the nominal interest at the same time I do not have a specific period in which countries go from 'normal' interest rates to low (dif-in-dif usually investigate the effect of a treatment that occurs at a specific time). Most countries did indeed experience low interest rates after the financial crisis of 2008. Should i use this year as a dividing point, or is this not necessary?
3) Some of the underlying independent variables may be endogenous. That is, the aging variable I use to define my dummy may be endogenous as gdp growth may lead to a larger share of old people as it could increase life expectancy, or it could increase the inflow of immigrants seeking job etc. Is it possible to use instrumental variables in this setting. An instrument for the aging variable would be birthrates from fx 1960-1980. This would purge the variable from the before mentioned endogeneity, but I'm not sure how to incorporate this when I'm actually regressing dummy variables.
I hope you can help
/Tobias
Comment