I Would like to check if a set of N points describe a convex polygon or not

I was wondering if there is a good algorithm for that ?

Here is some approaches I thought of:

**1.Convex Hull algorithm :**

If the set is equal to his convex hull then it's convex. The complexity of such algorithm are O(n*LN(N)). But I had the feeling it was like breaking a butterfly upon a wheel.

**3.Looking at the angles :**

Then I thought of checking if the angles of 2 consecutive vectors never exceed 180°. But since my points are not ordered I need to check all the combinations of 3 consecutives points and that makes like an O(n3) complexity.(There should be a way to do better than that)

I try selecting points from right to left for example but the results are not always the one expected:

For example in this case I find a convex shape if I take from left to right:

So for this solution I might need a good algorithm to select the points.

**3. looking at the barycenter :**

I think that checking if the baricenter of all 3 consecutives point is inside the shape will tell me if the shape is convex of not.

Here is what I mean (G is the baricenter of each triangle):

for this solution I can select the points from left to right without problems. if the complexity of checking if G is in the shape is O(N) then the overall complexity would be somthing like O(N2).

Can you please advise me on a good algorithm to solve this problem or improve the solutions I am thinking of

Thanks in advance

`N`

points (are they ordered?) then you can't get anything better than`N*log(N)`

. If I can come up with a proof, I'll be happy to share it with you, but right now, it's more a feeling thant a proof. – Fezvez Jul 4 '11 at 16:57