On the Number of Ordinary Lines Determined by n Points

On the number of circles determined byn points ⋮ Few slopes without collinearity ⋮ Bichromatic and equichromatic lines in \(\mathbb C^2\) and \(\mathbb R^2\) ⋮ A survey of Sylvester's problem and its generalizations ⋮ A Sylvester theorem for conic sections ⋮ Grünbaum's gap conjecture ⋮ On sets defining few ordinary lines ⋮ Lines, circles, planes and spheres ⋮ A generalisation of Sylvester's problem to higher dimensions ⋮ Geometria combinatoria e geometrie finite ⋮ Some combinatorial problems in the plane ⋮ On the number of ordinary lines determined by sets in complex space ⋮ Progress on Dirac's conjecture ⋮ Proof of a conjecture of Burr, Grünbaum, and Sloane ⋮ The ordinary line problem revisited ⋮ \(n^ 2\)-sets in a projective plane which determine exactly \(n^ 2+n\) lines ⋮ A constructive version of the Sylvester-Gallai theorem ⋮ On the number of ordinary circles determined by \(n\) points ⋮ Visibility and parallelotopes in projective space ⋮ A proof of a consequence of Dirac's conjecture ⋮ On the combinatorial problems which I would most like to see solved ⋮ Research problems ⋮ Beck's theorem for plane curves ⋮ On Zonotopes ⋮ On the Topology and Geometric Construction of Oriented Matroids and Convex Polytopes ⋮ On a generalization of the Gallai-Sylvester theorem ⋮ Extension of certain combinatorial estimates with geometrical background ⋮ On the affine Sylvester problem ⋮ There are not too many magic configurations ⋮ There exist \(6n/13\) ordinary points ⋮ Triangles in arrangements of lines ⋮ Triangles in arrangements of lines ⋮ On the minimum number of ordinary conics ⋮ Geometric matrices and an inequality for (0,1)-matrices ⋮ On sets defining few ordinary planes ⋮ A Gallai-type problem ⋮ On the geometry of real or complex supersolvable line arrangements ⋮ On the Number of Ordinary Conics ⋮ On finite sets of points in \(P^ 3\) ⋮ The use of research problems in high school geometry ⋮ On the number of ordinary planes ⋮ Triangles in arrangements of lines ⋮ Über die Projektionenkörper konvexer Polytope ⋮ A Generalization of the Theorem of Sylvester ⋮ The number of lines determined by \(n^2\) points ⋮ Affine embeddings of Sylvester-Gallai designs ⋮ On the lattice property of the plane and some problems of Dirac, Motzkin and Erdős in combinatorial geometry ⋮ On ordinary points in arrangements ⋮ Arrangements of lines with tree resolutions ⋮ On the number of circles determined by \(n\) points in the Euclidean plane ⋮ Beitrag zur kombinatorischen Inzidenzgeometrie