I need to plot a function f(x)
, where x
is discrete set of values (in my case positive integers). I couldn't find a way to specify a stepsize when using the range option and samples doesn't seem to be the right solution. Finally, I would like to approximate f(x)
with a smooth function.
I don't quite understand why samples is not the solution to your problem.
If I want to plot sin(x) on an interval between 0 and 10 with a point at every integer I use
set xrange [0:10]
set sample 11
plot sin(x) w p
Obviously the number of samples is xmaxxmin+1 (10  0 + 1 = 11).
Finally to tackle the approximation problem have a look at this website which discusses linear least squares fitting. For simple linear interpolation use lp
instead of p
.

The
smooth
style doesn't work if you have a sample spec that is identical to the number of datapoints. – Karl Aug 19 '15 at 8:32
Or alternatively, play around with the ceil(x)
or floor(x)
functions.
Maybe have a look at this example: http://gnuplot.sourceforge.net/demo/prob2.html
You can do:
plot [1:12] '+' u ($0):(f($0))
Where, $0
will be replaced by 1, 2, ..., 12. You can even do a smooth on this. For instance:
f(x)=sin(2*x)
plot [1:12] f(x) t 'the function'\
, '+' u ($0):(f($0)) t 'the points'\
, '+' u ($0):(f($0)) smooth cspline t 'the smooth'

Bit sketchy solution.
$0
are line numbers.plot [52:127] "+" us 0:(f($0))
already breaks unless you increase the number of samples. I'd at least add the lower value of the range spec to$0
. – Karl Aug 19 '15 at 8:21 
Btw., gnuplot 5.1 now has not only individual sampling ranges (new in 5.0) for each part of a plot, but also individual sampling increments. – Karl Aug 19 '15 at 8:38