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where the black curve is a moving average of the sampled values. That is, if the sampled values are... where the black curve is a moving average of the sampled values. That is, if the sampled values are [[latex($\'\alpha_i\}_{i=1}^N$)]] where [[latex($N$)]] is the number of simulations in the Metropolis Hastings chain, the moving average curve is defined as:
{{{#!latex
\[
a_{j}=\frac{1}{2q+1}\sum_{k=-q}^{q} \alpha_{j+k}
\]
}}}
for all [[latex($j$)]] between [[latex($q+1$)]] and [[latex($N-q$)]].

How to obtain trace plots after a Metropolis-Hastings

It can be useful to plot iterations vs. sampled values for each variable (parameter) in a chain. If the Metropolis-Hastings converges to a stable distribution, the trace plot has to be stable (e.g. no trend in the sampled values).

After a metropolis (that is after the estimation command in the mod file) you just have to write:

trace_plot(options_,M_,estim_params_,type,blck,name1,name2)

where:

  • options_, M_ and estim_params_ are Dynare's global structures describing the model,
  • type is a string equal to 'DeepParameter' (for a parameter of the structural model), 'MeasurementError' (std. or correlation in the measurement equation error) or 'StructuralShock' (for the standard deviation of a structural shock or the correlation between two shocks),

  • blck<mh_nblck is an integer specifying the mh chain to be considered.

  • name1 is a string specifying for instance the name of a deep parameter
  • name2 is an optional second string needed if you are interested in the correlation between two structural shocks or two measurement errors.

After the estimation of the model in fs2000.mod if we want to build a trace plot for parameter alp, we just have to write:

trace_plot(options_,M_,estim_params_,'DeepParameter',2,'alp')

and the following plot will pop up:

attachment:trace_plot.jpg

where the black curve is a moving average of the sampled values. That is, if the sampled values are latex($\'\alpha_i\}_{i=1}^N$) where latex($N$) is the number of simulations in the Metropolis Hastings chain, the moving average curve is defined as:

\[
a_{j}=\frac{1}{2q+1}\sum_{k=-q}^{q} \alpha_{j+k}
\]

for all latex($j$) between latex($q+1$) and latex($N-q$).

DynareWiki: TracePlots (last edited 2009-03-25 17:12:09 by localhost)