Tips and tricks
Step monitor
It is sometimes irritating when a calculation takes very long and nothing appears to happen. In such cases a step monitor may be useful to indicate the state of the calculations. It is a simple gimmick.
Take, as an example, a modification of the Listing 37.1: Finding the minimum of the Rosenbrock function with the BFGSmax routine given in Gretl's user guide. The printf
command prints the values of x and y and ends with a carriage return. The command flush
induces printing at each step. To simulate a time consuming routine, a delay of .003 has been inserted by giving the command sleep(.003)
.
Open the the gretl script editor (File → Script files → New script) and paste the following code:
set verbose off # This defines the function to be maximized function scalar Rosenbrock( const matrix param "parameters" ) scalar x = param[1] scalar y = param[2] printf "x =%7.4f, y =%7.4f \r",x,y # the information printed at each step flush # this induces immediate printing sleep(.003) # this simulates a time-consuming process return -(1-x)^2 - 100 * (y - x^2)^2 end function # This invokes the maximization routine matrix theta = {0, 0} # initial values for theta set max_verbose off M = BFGSmax(&theta, Rosenbrock(theta) ) printf " \r" # destroy the last step message flush # flush it printf "\ntheta: %8.4f \n", theta
Now run the script (push the gears button or Ctrl+R). The successive estimates of x and y will be monitored. Other information can easily be monitored as well, the value of the criterion -(1-x)^2 - 100 * (y - x^2)^2
for instance, by simply including it in the printf
command in the Rosenbrook function.
"=" trick for eval
Sometimes you simply need to check the result of an expression in the Gretl console, such as 2+2. To do this you should use the eval
command like this:
? eval 2+2 4
Since without the command, gretl raises an error:
? 2+2 Parse error at unexpected token '2'
But eval
is too long to type. You can use an =
before the expression (as in a spreasheet) to get the same result as eval
:
? =2+2 4