How to interpolate N points that do not describe a function

Suppose i have `n` points, also suppose that this points have an order, and not necessary this points make a function. I'm wondering how to interpolate them if the points do not describe a function? For example this will be the original points:

And i hope this result:

Note that only using splines do not works because the points do not make a function, and also using Bezier curves do not works because them do not interpolate the points (only pass near of them). How can i do for get this? Is there an algorithm for that?

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This curve in the plane can be parametrized by a pair of functions `x(t)` and `y(t)`. Do you have a known order in which to traverse the points or does that have to be determined as well? –  A. Webb Nov 9 '12 at 18:17

1. There are a lot of kinds of splines, and, for example, Catmull-Rom splines are applicable here.

2. Simple and interesting method for interpolation by Bezier curves has been proposed by Maxim Shemanarev

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Thanks very much, Interpolation by Bezier Curves works great for me. I only made a small change for adapt it to open curves (not closed ones). –  Raul Otaño Nov 13 '12 at 16:05
The first is that in the situation given there's always a function. Mathematically, you describe a curve as a function from the real numbers, roughly representing "time", to your space. This is often called a parametric representation of the curve. We write the function as `f(t) =( x(t), y(t) )`, where `x(t)` and `y(t)` are the individual parameter functions.