Mismatch between Smoothed and Historical Time Series
Posted: Thu Aug 14, 2014 2:17 am
Hi All
Here is a problem I have not faced before: the Kalman smoothed series does not match with the observed time series used in the estimation. I am using fifteen series and this problem is seen only for one observable,namely output growth. The source of the problem may lie in the following, even though I cannot think of a scientific explanation yet. The estimate of the 'corresponding' shock to output (std error and AR1 coefficient), the technology shock is very similar to the prior density I use. Alternatively, when I either use a measurement error for output growth, or another structural shock as the govt spending shock (which affects only the goods market clearing condition), the smoothed output growth series matches the observed analogue perfectly, as they should. Hence, this seems to be a problem with the kind of shock used to match the observable to the model. Has anybody else encountered this problem? I cannot find any errors in the coding of the structural equations.
Reuben
Here is a problem I have not faced before: the Kalman smoothed series does not match with the observed time series used in the estimation. I am using fifteen series and this problem is seen only for one observable,namely output growth. The source of the problem may lie in the following, even though I cannot think of a scientific explanation yet. The estimate of the 'corresponding' shock to output (std error and AR1 coefficient), the technology shock is very similar to the prior density I use. Alternatively, when I either use a measurement error for output growth, or another structural shock as the govt spending shock (which affects only the goods market clearing condition), the smoothed output growth series matches the observed analogue perfectly, as they should. Hence, this seems to be a problem with the kind of shock used to match the observable to the model. Has anybody else encountered this problem? I cannot find any errors in the coding of the structural equations.
Reuben