Given a set of `n`

points, can we find three points that describe a triangle with minimum area in `O(n^2)`

? If yes, how, and if not, can we do better than `O(n^3)`

?

I have found some papers that state that this problem is at least as hard as the problem that asks to find three collinear points (a triangle with area 0). These papers describe an `O(n^2)`

solution to this problem by reducing it to an instance of the 3-sum problem. I couldn't find any solution for what I'm interested in however. See this (look for General Position) for such a paper and more information on 3-sum.