Dynare forums

[tanya]

Dear all

I am estimating a standard RE model


model(linear);

x(1) = a11*x + a12*y(-1) + a13*eps;
y = a21*x + a22*y(-1) + a23*eta;

end;

I specify priors in the for of (for example)

a11,a110,a11min,a11max,NORMAL_PDF,mean,sd;

where a110, as I understand, is used to compute initial likelihood. Suppose the Blanchard-Kahn conditions are satisfied for a110 (and other initial values). Does this imply that posterior distributions are such that the Blanchard-Kahn conditions are satisfied? When the dynare takes a random draw of aij coefficients and finds that BK conditions are NOT satisfied, what does it do? Since it never crashes I suspect it assumes the likelihood is minus (or plus) large number and ignores this combination. Am I right?


Tanya

[aajello]

Theoretically it should, however more than once I have left a series of optimizers running overnight, just to find out in the morning that the last mode candidate saved by the routine did not satisfy the Blanchard-Kahn conditions.

I am wondering if this is a rounding problem of coefficients that live close to an indeterminacy region and are stored with a lower degree of precision after the last iteration of the optimizer. Is there any way to overcome it?

I would be grateful if anyone had any thoughts about this matter. Thanks,

Andrea