Um, you generally don't want to interpolate noisy data! That is just a good way to amplify the noise. I did show many years ago, that the best way to interpolate noisy data is probably simple linear interpolation, thus connect the dots. Even better in that respect is just nearest neighbor interpolation. Typically higher order methods, such as a spline interpolation can produce a solution that is higher variance at any intermediate point. So you don't want to interpolate noise.
Perhaps better is to first smooth your data. Now you can use tools to interpolate the smoothed response. There are of course many tools you can use to smooth data.
t = 1:100;
Y = sin(t/10) + randn(size(t))/3;
plot(t,Y,'o')
Now, if we interpolate the noisy data, we get noisy crap.
tint = linspace(min(t),max(t),1000);
Yint = interp1(t,Y,tint,'spline');
plot(t,Y,'ro',tint,Yint,'r-')
plot(t,smooth(Y),'o')
Clearly an interpolation will fare better based on the smoothed result, though when the noise to signal ratio is high enough, we can still get crap.
