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Given a polygon (not necessary convex) in the Cartesian coordinate, i wonder if there are any way to check the symmetricalness of that polygon?

I can think of an O(N) solution: using rotating calipers to check if each pair of opposite edge is parallel and equal in size. However, i can't prove the correctness of that algorithm. Can you suggest any better solution?

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From your description of your proposed solution, I'm assuming you're only looking for 180° rotational symmetry, and not any other kind (e.g. 120° rotational, reflective, etc) –  Damien_The_Unbeliever May 4 '11 at 9:10
Checking pairs only works for polygons with an even number of edges. –  Sjoerd C. de Vries May 4 '11 at 10:37
I think all the polygon with an odd number of edges can't be symmetric? @@ –  Chan Le May 4 '11 at 13:37
They can be rotation symmetric. –  Sjoerd C. de Vries May 4 '11 at 14:40
Isn't an equilateral (3 sides) symmetrical? You can definitely fold it in half onto itself, which is one definition of symmetric. –  JCooper May 6 '11 at 14:29

2 Answers 2

up vote 1 down vote accepted
  • You compute the center of gravity of your polygon.
  • You translate it to the origin so that your center of gravity has (0,0) as coordinate.
  • Then for each vertex of coordinate (i, j) you check that there is a vertex that has coordinates (-i, -j).

This will prove that your polygon is symmetric indeed.

Complexity : N, assuming you can access directly your vertices from their coordinates.

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@ezku : No it, checks symmetry over the center. –  Park Young-Bae May 4 '11 at 9:11
what if the polygon has a point on one side which is on an edge, which does not occur on the other side polygon which has an edge which is identical? so A has points (0,0),(0,1),(0,2) and B has and edge (2,0),(2,2). They could be identical through the reflection line through x=2. You would need to ensure the polygon does not have extraneous points first... –  Sam Holder May 4 '11 at 9:13
This checks that the polygon has the same vertices, but doesn't guarantee that they're connected in the same order. –  Damien_The_Unbeliever May 4 '11 at 9:17
@ackb : And since when is a triangle symmetrical ? –  Park Young-Bae May 5 '11 at 8:04
Obviously, not every triangle is symmetric. But an equilateral triangle, e.g., has three reflective and a three rotational symmetries, none of which will be found by your algorithm. –  ackb May 7 '11 at 5:42

You've got to make it more clear what kind of symmetry is allowed. Central symmetry (a.k.a. 180 degree rotation)? Mirror symmetry over one of the axes? Rotation by any degree? In some applications only rotations by 0,90,180,270 + mirroring are allowed... The answer would be different in each case.

For central symmetry only, if you assume that polygon is nicely representer (i.e. no extra vertices on edges, and vertices are held in a contained with a forward operator, then the centrally symmetric polygon would have an even number 2*N verices, and you can do this:

  1. Set iter1 reference 0th vertex, and iter2 to reference Nth vertex.

  2. Repeat N times:

    if( *iter1 != *iter2 ) return false;

  3. return true;

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