On Erdos' ten-point problem

Around 1994, Erdoset al. abstracted from their work the following problem: “Given ten pointsA _ij, 1≤i≤j≤5, on a plane and no three of them being collinear, if there are five pointsA _k, 1≤k≤5, on the plane, including points at infinity, with at least two points distinct, such thatA _i, A_j, A_ij are collinear, where 1≤i≤j≤5, is it true that there are only finitely many suchA _k's?” Erdoset al. obtained the result that generally there are at most 49 groups of suchA _k's. In this paper, using Clifford algebra and Wu's method, we obtain the results that generally there are at most 6 such groups ofA _k's.