# Looking for a “closing curves connecting with respect to points” algorithm

I am looking for an algorithm that can connect points together with a continuous curve line. Imagine drawing from point a to b to c until the last point, and when you draw from point to point, the line must be a curve and is continuous with respect to the previous point and next point, as if the given points are just samples of a closed loop. Please see figure below for illustration.

Are there such algorithm for something like this?

*The circles in the figure are my list of points.

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You may find splines useful: en.wikipedia.org/wiki/Spline_(mathematics) –  usul Jul 4 '11 at 19:19
Are the points ordered or unordered? –  Mikola Jul 4 '11 at 19:42
@Mikola: The points are always in order. –  Karl Jul 5 '11 at 5:45
@bo1024: you may wish to put your comment into as one of the answers. Let me give you some points. –  Karl Jul 5 '11 at 6:58
It seems that this post gets downvoted for suggestive answers. I'll post here, if Karl likes it, i'll post as an answer thx. If your shape is almost guaranteed to be a convex shape, basically you are looking for top 2 'shortest' edges among all the vertexes. So say, the topmost vertex has an edge to all other vertices, you can establish the first two lines(or edges) by looking up the 'shortest' 2 lines(or edges). Then for your next node, you do this again until satisfied. This method will converge (an example criterion would be total distance of the edges). –  Gary Tsui Jul 5 '11 at 16:00
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Given that your points are ordered, spline interpolation is definitely the best way to go here. (As indicated by by bo1024's comment) I highly recommend the following notes:

http://www.cs.mtu.edu/~shene/COURSES/cs3621/NOTES/

And specifically the section here would be most relevant to getting a closed loop like you asked for:

http://www.cs.mtu.edu/~shene/COURSES/cs3621/NOTES/spline/B-spline/bspline-curve-closed.html

EDIT: If the curve has to pass through the points, then the unique degree n solution is the Lagrange interpolating polynomial. You can just make one polynomial for each component of your points vectors using the formula on the wiki page:

http://en.wikipedia.org/wiki/Lagrange_polynomial

Unfortunately Lagrange interpolation can be pretty noisy if you have too many points. As a result, I would still recommend using some fixed degree spline interpolation. Instead of B-splines, another option are Hermite polynomials:

http://en.wikipedia.org/wiki/Cubic_Hermite_spline

These will guarantee that the curve passes through the points. To get a closed curve, you need to repeat the the first d points of your curve when solving for the coefficients, where d is the degree of the Hermite spline you are using to approximate your points.

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Thanks for the suggestion. In this case, the splines will curve with respect to the points but I require that the curve must pass through each point. :) –  Karl Jul 5 '11 at 7:02
@Karl: Ok, updated the solution to reflect this latest information. –  Mikola Jul 5 '11 at 7:23
@Mikole: Lagrange polynomials are not a good fit for this kind of problems as they tend to be instable (see Runge's prhenomenon) and there is also the problem of the closing point. –  salva Jul 5 '11 at 7:25
@salva: Right, if you look at the current answer I only threw them out there as one option. I think I had some half written thing where I was a bit less disparaging of their use that I accidentally posted as I was hastily editing. But you are correct, Runge's phenomenon would cause them to be pretty noisy for arbitrary point data. –  Mikola Jul 5 '11 at 7:29
hermite spline seems a good choice –  fa. Jul 5 '11 at 7:58