I have the values x = 0 => y = 0 x = 1 => y = 1 x = 2 => y = 27 x = 3 => y = 64

This is an odd way to list points.

Too bad that they aren't part of y = x^3. These are:

(x, y) = { (0,0), (1,1), (2, 8), (3, 27), (4, 64), (5, 125)...}

UPDATE:

I'd word your question differently. Your "example" set of points is incorrect and misleading. It sounds like you're really saying "I have an arbitrary set of points and I'd like to fit a function to them."

If you know the form of the funcion you need, the problem is merely about calculating the unknown coefficients. If you have as many points as coefficients you can solve for them (if a solution exists). If you have more points than coefficients you can do least squares fitting.

But all this depends on knowing what function you want beforehand.

Asking a computer to ferret out both the best form and the coefficient values for you is a daunting task.

You can certainly use Lagrange interpolation between points, but it still may not be the thing to tell you what the "best" function is to represent your points. It assumes polynomial forms, so mixing in other functions isn't part of the method. It could give you a very nice representation for sin(x), but it won't come out and tell you that a sine function would be easier to understand than a polynomial approximation.