Interpolation does NOT allow the data to change. Essentially, that is what interpolation means. You need to do SMOOTHING, not interpolation, so approximation.
What form of approximation is best? That very much depends on the shape of the curve you need to approximate. And very much on what you know about the curve. It also depends on what kind of noise you have in the data. It sounds as if you want to approximate specific data points, and that suggests they are outliers, a completely different type of problem. Essentially, this makes it a large residual problem, and one where you have two separate sources of noise in your data, one of which creates large errors. In the end, this is something one could write a book about, and many have been written.
A simple low order poynomial model might be adequate. Or a nonlinear model. Or a smoothing spline. Or just a general smoothing tool (things like a median filter, or a Savitsky-Golay filter, etc.) If this is an outlier problem as I suspect, then there are outlier detection and replacement tools available.
Again, a book, even several books. And without knowing more about your data, it is difficult to be more specific. But interpolation is the one thing you don't want to do.
