# Sort points in clockwise order?

Given an array of x,y points, how do I sort the points of this array in clockwise order (around their overall average center point)? My goal is to pass the points to a line-creation function to end up with something looking rather "solid", as convex as possible with no lines intersecting.

For what it's worth, I'm using Lua, but any pseudocode would be appreciated. Thanks so much for any help!

Update: For reference, this is the Lua code based on Ciamej's excellent answer (ignore my "app" prefix):

``````function appSortPointsClockwise(points)
local centerPoint = appGetCenterPointOfPoints(points)
app.pointsCenterPoint = centerPoint
table.sort(points, appGetIsLess)
return points
end

function appGetIsLess(a, b)
local center = app.pointsCenterPoint

if a.x >= 0 and b.x < 0 then return true
elseif a.x == 0 and b.x == 0 then return a.y > b.y
end

local det = (a.x - center.x) * (b.y - center.y) - (b.x - center.x) * (a.y - center.y)
if det < 0 then return true
elseif det > 0 then return false
end

local d1 = (a.x - center.x) * (a.x - center.x) + (a.y - center.y) * (a.y - center.y)
local d2 = (b.x - center.x) * (b.x - center.x) + (b.y - center.y) * (b.y - center.y)
return d1 > d2
end

function appGetCenterPointOfPoints(points)
local pointsSum = {x = 0, y = 0}
for i = 1, #points do pointsSum.x = pointsSum.x + points[i].x; pointsSum.y = pointsSum.y + points[i].y end
return {x = pointsSum.x / #points, y = pointsSum.y / #points}
end
``````

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Think about compute the angle of the radial line through that point. Then sort by angle. –  GregS Aug 8 '11 at 22:00
+1 Fabulous that you also shared the Lua code. –  Iterator Aug 11 '11 at 1:09
In case you didn't know, lua has a builtin function `ipairs(tbl)` that iterates over the indices and values of tbl from 1 to #tbl. So for the sum calculation, you can do this, which most people find looks cleaner: `for _, p in ipairs(points) do pointsSum.x = pointsSum.x + p.x; pointsSum.y = pointsSum.y + p.y end` –  Wallacoloo Aug 15 '11 at 17:49
@Wallacoloo That's highly arguable. Also, in vanilla Lua `ipairs` is significantly slower than numeric for loop. –  Alexander Gladysh Oct 5 '11 at 9:43
I had to make some small changes to get it to work for my case (just comparing two points relative to a centre). gist.github.com/personalnadir/6624172 All those comparisons to 0 in the code seem to assume that the points are distributed around the origin, as opposed to an arbitrary point. I also think that first condition will sort points below the centre point incorrectly. Thanks for the code though, it's been really helpful! –  personalnadir Sep 19 '13 at 14:18

First compute the center point. Then sort the points using whatever sorting algorithm you like, but use special comparison routine to determine whether one point is less than the other.

You can check whether one point (a) is to the left or to the right of the other (b) in relation to the center by this simple calculation:

``````det = (a.x - center.x) * (b.y - center.y) - (b.x - center.x) * (a.y - center.y)
``````

if the result is zero, then they are on the same line from the center, if it's positive or negative, then it is on one side or the other, so one point will precede the other. Using it you can construct a less-than relation to compare points and determine the order in which they should appear in the sorted array. But you have to define where is the beginning of that order, I mean what angle will be the starting one (e.g. the positive half of x-axis).

The code for the comparison function can look like this:

``````bool less(point a, point b)
{
if (a.x - center.x >= 0 && b.x - center.x < 0)
return true;
if (a.x - center.x < 0 && b.x - center.x >= 0)
return false;
if (a.x - center.x == 0 && b.x - center.x == 0) {
if (a.y - center.y >= 0 || b.y - center.y >= 0)
return a.y > b.y;
return b.y > a.y;
}

// compute the cross product of vectors (center -> a) x (center -> b)
int det = (a.x - center.x) * (b.y - center.y) - (b.x - center.x) * (a.y - center.y);
if (det < 0)
return true;
if (det > 0)
return false;

// points a and b are on the same line from the center
// check which point is closer to the center
int d1 = (a.x - center.x) * (a.x - center.x) + (a.y - center.y) * (a.y - center.y);
int d2 = (b.x - center.x) * (b.x - center.x) + (b.y - center.y) * (b.y - center.y);
return d1 > d2;
}
``````

This will order the points clockwise starting from the 12 o'clock. Points on the same "hour" will be ordered starting from the ones that are further from the center.

If using integer types (which are not really present in Lua) you'd have to assure that det, d1 and d2 variables are of a type that will be able to hold the result of performed calculations.

If you want to achieve something looking solid, as convex as possible, then I guess you're looking for a Convex Hull. You can compute it using the Graham Scan. In this algorithm you also have to sort the points clockwise (or counter-clockwise) starting from a special pivot point. Then you repeat simple loop steps each time checking if you turn left or right adding new points to the convex hull, this check is based on cross product just like in the above comparison function.

Edit:

Added one more if statement `if (a.y - center.y >= 0 || b.y - center.y >=0)` to make sure that points that have x=0 and negative y are sorted starting from the ones that are further from the center. If you don't care about order of points on the same 'hour' you can omit this if statement and always return `a.y > b.y`.

Corrected the first if statements with adding `-center.x` and `-center.y`.

Added the second if statement `(a.x - center.x < 0 && b.x - center.x >= 0)`. It was an obvious oversight that it was missing. The if statements could be reorganized now, because some checks are redundant. For example if the first condition in the first if statement is false, then the first condition of the second if must be true. I decided, however, to leave the code as it is for the sake of simplicity. It's quite possible that the compiler will optimize the code and produce the same result anyway.

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+1 for a non-atan solution! –  MSN Aug 8 '11 at 23:27
+1: No `atan()`, no square root, and even no divisions. This is a good example of computer graphics thinking. Cull off all the easy cases as soon as possible, and even in the hard cases, compute as little as possible to know the required answer. –  RBerteig Aug 9 '11 at 1:29
But it requires comparing all points to all others. Is there a simple method of inserting new points? –  Iterator Aug 9 '11 at 1:43
+1 for Graham Scan. Good suggestion. –  Iterator Aug 9 '11 at 1:47
if the set of points is known a priori it only takes O(n*log n) comparisons. If you want to add points in the meantime then you need to keep them in a sorted set such as a balanced binary search tree. In such a case adding a new point requires O(log n) comparisons and it's exactly the same for the solution involving polar coordinates. –  ciamej Aug 9 '11 at 1:49

An interesting alternative approach to your problem would be to find the approximate minimum to the Traveling Salesman Problem (TSP), ie. the shortest route linking all your points. If your points form a convex shape, it should be the right solution, otherwise, it should still look good (a "solid" shape can be defined as one that has a low perimeter/area ratio, which is what we are optimizing here).

You can use any implementation of an optimizer for the TSP, of which I am pretty sure you can find a ton in your language of choice.

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Yikes. "Interesting" is an understatement. :) –  Iterator Aug 10 '11 at 20:02
@Iterator: I was quite happy with my idea, I was pretty disappointed to get downvoted for it :-/ Do you think it's valid? –  static_rtti Aug 11 '11 at 6:45
I didn't downvote, but think about the computational complexity of your suggestion. –  Iterator Aug 11 '11 at 12:04
I was suggesting to use one of the many fast approximations, not the NP-complete original algorithm, of course. –  static_rtti Aug 11 '11 at 12:13
I appreciate the additional angle! To have several valid, if very different answers, might be of great help if someone in the future happens to stumble on this thread looking to brainstorm options. –  Philipp Lenssen Aug 12 '11 at 9:14
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What you're asking for is a system known as polar coordinates. Conversion from Cartesian to polar coordinates is easily done in any language. The formulas can be found in this section.

I don't know Lua, but this page appears to offer code snippets for this conversion.

After converting to polar coordinates, just sort by the angle, theta.

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This will work, but it will also have the defect of doing more computation than needed to answer the ordering question. In practice, you don't actually care about either the actual angles or radial distances, just their relative order. ciamej's solution is better because it avoids divisions, square roots, and trig. –  RBerteig Aug 9 '11 at 1:28
I'm not sure what your criterion is for "better". For instance, comparing all points to each other is kind of a waste of computation. Trig isn't something that scares adults, is it? –  Iterator Aug 9 '11 at 1:42
It's not that trig is scary. The issue is that trig is expensive to compute, and wasn't needed to determine the relative order of the angles. Similarly, you don't need to take the square roots to put the radii in order. A full conversion from Cartesian to polar coordinates will do both an arc-tangent and a square root. Hence your answer is correct, but in the context of computer graphics or computational geometry it is likely to not be the best way to do it. –  RBerteig Aug 9 '11 at 1:51
Got it. However, the OP didn't post as comp-geo, that was a tag by someone else. Still, it looks like the other solution is polynomial in the # of points, or am I mistaken? If so, that burns more cycles than trig. –  Iterator Aug 9 '11 at 1:53
I hadn't actually noticed the comp-geo tag, I just assumed that the only rational applications for the question had to be one or the other. After all, the performance question becomes moot if there are only a few points, and/or the operation will be done rarely enough. At that point, knowing how to do it at all becomes important and that is why I agree your answer is correct. It explains how to compute the notion of a "clockwise order" in terms that can be explained to just about anybody. –  RBerteig Aug 9 '11 at 2:04