It sounds like you want a deterministic, non-random set of points. You can use the inverse gaiussian CDF to do what you want.
a = -2.5;
b = 3;
N = 40;
x = norminv(linspace(normcdf(a),normcdf(b),N));
xline(x,'r')
So most dense at zero, and a density that drops off away from there. I chose limits that are not centered around zero, but had they been centered, the set would be perfectly symmetric.
Of course, you can adjust the speed of fall off, by use of a different variance on the implicit Gaussian.
