Testing Prior mean
Posted: Sat Feb 07, 2015 11:52 pmDear All,
I'm trying to check the identification of the priors of the model I'm going to estimate. I found this message as results of the test for prior mean (I used identification command):
==== Identification analysis ====
Testing prior mean
WARNING !!!
The rank of H (model) is deficient!
bh is not identified in the model!
[dJ/d(bh)=0 for all tau elements in the model solution!]
WARNING !!!
The rank of J (moments) is deficient!
bh is not identified by J moments!
[dJ/d(bh)=0 for all J moments!]
Monte Carlo Testing
Testing MC sample
All parameters are identified in the model (rank of H).
All parameters are identified by J moments (rank of J)
What is the main interpretation? Is there an identification problem? If I calibrate (not estimate) bh, I don't have anymore this problem. But in case of estimation of the DSGE using bh estimated, what is the main issue of my estimation? Lack of identification? Do I need to check some other priors to avoid problems for bh?
Thanks for help!
I'm trying to check the identification of the priors of the model I'm going to estimate. I found this message as results of the test for prior mean (I used identification command):
==== Identification analysis ====
Testing prior mean
WARNING !!!
The rank of H (model) is deficient!
bh is not identified in the model!
[dJ/d(bh)=0 for all tau elements in the model solution!]
WARNING !!!
The rank of J (moments) is deficient!
bh is not identified by J moments!
[dJ/d(bh)=0 for all J moments!]
Monte Carlo Testing
Testing MC sample
All parameters are identified in the model (rank of H).
All parameters are identified by J moments (rank of J)
What is the main interpretation? Is there an identification problem? If I calibrate (not estimate) bh, I don't have anymore this problem. But in case of estimation of the DSGE using bh estimated, what is the main issue of my estimation? Lack of identification? Do I need to check some other priors to avoid problems for bh?
Thanks for help!