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Lets take thess points.

pt={{-4.65371,0.1},{-4.68489,0.103169},{-4.78341,0.104834},{-4.83897,0.100757},
{-4.92102,0.0949725},{-4.93456,0.100181},{-4.89166,0.122666},{-4.78298,0.129514}, 
{-4.72723,0.121442},{-4.68355,0.11023},{-4.65371,0.1},{-4.66924,0.10173}, 
{-4.93059,0.0966989},{-4.93259,0.105094},{-4.91074,0.116966},{-4.90635,0.094878}, 
{-4.66846,0.105327},{-4.92647,0.0956182},{-4.93433,0.102498},{-4.9333,0.0982262},
{-4.66257,0.10102}};

Now they are in certain order (for me is a disorder!) which can be seen if we look at the ListLinePLot

picUnorder=ListLinePlot[pt,Frame-> True,Mesh-> All,MeshStyle-> PointSize[Large]];
SeepicUnorder=ListLinePlot[pt,Frame-> True,Mesh-> All,MeshStyle-> 
PointSize[Large]]/.Line[rest_]:>{Arrowheads[Table[0.02,{i,0,1,.02}]],Arrow[rest]};
GraphicsGrid[{{picUnorder,SeepicUnorder}}]

enter image description here

But we need to order them like the picture below.

enter image description here

Does anybody has some suggestion for a algorithm to sort such 2D points in counter clockwise direction so that we can rearrange the list of points to create a geometry like the last pic just by using ListLinePlot on the rearranged points????

Using the suggestion we get something like the following.

center=Mean[pt];
pts=SortBy[pt,Function[p,{x,y}=p-center;ArcTan[x,y]]];
Show[ListPlot[pt],ListLinePlot[pts,Mesh-> All,MeshStyle->
PointSize[Large]],Frame-> True]

enter image description here

BR

share|improve this question
    
"clockwise" needs a center and a space orientation ... the problem is the center ... –  belisarius Oct 6 '11 at 12:13
2  
Allow me to remind three things we usually do here: 1) As you receive help, try to give it too answering questions in your area of expertise 2) Read the FAQs 3) When you see good Q&A, vote them up by using the gray triangles, as the credibility of the system is based on the reputation that users gain by sharing their knowledge. Also remember to accept the answer that better solves your problem, if any, by pressing the checkmark sign –  belisarius Oct 6 '11 at 12:18
    
Thanks @belisarius I will try my best to follow the suggestions. By the way do you think the answer with FindShortestTour is valid for general concave cluster of points? –  PlatoManiac Oct 6 '11 at 12:22
1  
no, but I don't think you'll find a general solution –  belisarius Oct 6 '11 at 12:29

5 Answers 5

up vote 3 down vote accepted

I've just read in a comment to nikie's answer that what you really want is the algorithm for an airfoil. So, I am posting another (unrelated) answer to this problem:

enter image description here

Seems easier than the general problem, because it is "almost convex". I think the following algorithm reduce the risks that FindShortestTour inherently has at the acute vertex:

  1. Find the ConvexHull (that accounts for the upper and attack surfaces)
  2. Remove from the set the points in the convex hull
  3. Perform a FindShortestTour with the remaining points
  4. Join both curves at the nearest endpoints
  5. Voilà

Like this:

pt1 = Union@pt;
<< ComputationalGeometry`
convexhull = ConvexHull[pt1, AllPoints -> True];
pt2 = pt1[[convexhull]];
pt3 = Complement[pt1, pt2];
pt4 = pt3[[(FindShortestTour@pt3)[[2]]]];
If[Norm[Last@pt4 - First@pt2] > Norm[Last@pt4 - Last@pt2], pt4 = Reverse@pt4];
pt5 = Join[pt4, pt2, {pt4[[1]]}];
Graphics[{Arrowheads[.02], Arrow@Partition[pt5, 2, 1], 
          Red, PointSize[Medium], Point@pt1}]

enter image description here

share|improve this answer

Maybe you could do something with FindShortestTour. For example

ptsorted = pt[[FindShortestTour[pt][[2]]]];
ListPlot[ptsorted, Joined -> True, Frame -> True, PlotMarkers -> Automatic]

produces something like

plot of shortest tour

share|improve this answer
    
Thanks it solves somewhat my problem. –  PlatoManiac Oct 6 '11 at 12:36

I posted the following comment below your question: I don't think you'll find a general solution. This answer tries to dig a little on that.

Heike's solution seems fair, but FindShortestTour is based on the metric properties of the set, while your requirement is probably more on the topological side.

Here is a comparison on two points sets and the methods available to FindShortestTour:

pl[method_, k_] :=
  Module[{ptsorted, pt,s},
   little[x_] := {{1, 0}, {2, 1}, {1, 2}, {0, 1}}/x - (1/x) + 2;
   pt = Join[{{0, 0}, {4, 4}, {4, 0}, {0, 4}}, little[k]];
   ptsorted = Join[s = pt[[FindShortestTour[pt,Method->method][[2]]]], {s[[1]]}];
   ListPlot[ptsorted, Joined -> True, Frame -> True, 
                      PlotMarkers -> Automatic, 
                      PlotRange -> {{-1, 5}, {-1, 5}}, 
                      Axes -> False, AspectRatio -> 1, PlotLabel -> method]];
GraphicsGrid@
 Table[pl[i, j],
       {i, {"AllTours", "CCA", "Greedy", "GreedyCycle", 
            "IntegerLinearProgramming", "OrOpt", "OrZweig", "RemoveCrossings",
            "SpaceFillingCurve", "SimulatedAnnealing", "TwoOpt"}}, 
       {j, {1, 1.8}}]

     Fat Star         Slim Star

enter image description here

As you can see, several methods deliver the expected result on the left column, while only one does it on the right one. Moreover, the only useful method for the set on the right is completely off for the column on the left.

share|improve this answer

Why don't you just sort the points?:

center = Mean[pt];
pts = SortBy[pt, Function[p, {x, y} = p - center; ArcTan[x, y]]]
Show[ListPlot[pt], ListPlot[pts, Joined -> True]]

Note that the polygon in your last plot is concave, so the points are not ordered clockwise!

share|improve this answer
    
It is still not the formation I want after sorting. It is not like the last pic of my post. But thanks for the answer. –  PlatoManiac Oct 6 '11 at 11:35
1  
@PlatoManiac: That's what I've been trying to tell you with the last sentence: The plot you showed is not clockwise. What kind of ordering do you want? What do you need this for? –  nikie Oct 6 '11 at 12:02
    
Look at this simply by taking the right most point and then order the rest of the points not clock wise but anticlockwise and come back to the right most point. This forms a closed loop by starting with the right most point and ending at the same point. I need to order this points to for a 2D airfoil. enda1312.files.wordpress.com/2011/03/airfoil.gif –  PlatoManiac Oct 6 '11 at 12:11
3  
@PlatoManiac: The polygon you want is concave. It has inflection points. It's clockwise at some points, counterclockwise at others. –  nikie Oct 6 '11 at 12:43
    
You are exactly right. Actually it seems no general solution to this problem exists. Sometimes your solution may work and sometimes not. –  PlatoManiac Oct 6 '11 at 13:26

Here's a python function which orders points counterclockwise. It Graham's Scan theorem. I've written it because I misunderstood a homework. It needs optimizing,though.

def order(a):
from math import atan2
arctangents=[]
arctangentsandpoints=[]
arctangentsoriginalsandpoints=[]
arctangentoriginals=[]
centerx=0
centery=0
sortedlist=[]
firstpoint=[]
k=len(a)
for i in a:
    x,y=i[0],i[1]
    centerx+=float(x)/float(k)
    centery+=float(y)/float(k)
for i in a:
    x,y=i[0],i[1]
    arctangentsandpoints+=[[i,atan2(y-centery,x-centerx)]]
    arctangents+=[atan2(y-centery,x-centerx)]
    arctangentsoriginalsandpoints+=[[i,atan2(y,x)]]
    arctangentoriginals+=[atan2(y,x)]
arctangents=sorted(arctangents)
arctangentoriginals=sorted(arctangentoriginals)
for i in arctangents:
    for c in arctangentsandpoints:
        if i==c[1]:
            sortedlist+=[c[0]]
for i in arctangentsoriginalsandpoints:
    if arctangentoriginals[0]==i[1]:
        firstpoint=i[0]
z=sortedlist.index(firstpoint)
m=sortedlist[:z]
sortedlist=sortedlist[z:]
sortedlist.extend(m)
return sortedlist
share|improve this answer

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