The Szemerédi–Trotter theorem is a mathematical result in the field of combinatorial geometry. It asserts that given points and lines in the Euclidean plane, the number of incidences is this bound cannot be improved, except in terms of the implicit constants. As for the implicit constants, it was shown by János Pach, Radoš Radoičić, Gábor Tardos, and Géza Tóth that the upper bound holds. On the other hand, Pach and Tóth showed that the statement does not hold true if one replaces the coefficient 2.5 with 0.42. An equivalent formulation of the theorem is the following. Given points and an integer, the number of lines which pass through at least of the points is The original proof of Endre Szemerédi and William T. Trotter was somewhat complicated, using a combinatorial technique known as cell decomposition. Later, László Székely discovered a much simpler proof using the crossing number inequality for graphs. The Szemerédi–Trotter theorem has a number of consequences, including Beck's theorem in incidence geometry.
Proof of the first formulation
We may discard the lines which contain two or fewer of the points, as they can contribute at most incidences to the total number. Thus we may assume that every line contains at least three of the points. If a line contains points, then it will contain line segments which connect two consecutive points along the line. Because after discarding the two-point lines, it follows that, so the number of these line segments on each line is at least half the number of incidences on that line. Summing over all of the lines, the number of these line segments is again at least half the total number of incidences. Thus if denotes the number of such line segments, it will suffice to show that Now consider the graph formed by using the points as vertices, and the line segments as edges. Since each line segment lies on one of lines, and any two lines intersect in at most one point, the crossing number of this graph is at most the number of points where two lines intersect, which is at most. The crossing number inequality implies that either, or that. In either case, giving the desired bound
Proof of the second formulation
Since every pair of points can be connected by at most one line, there can be at most lines which can connect at or more points, since. This bound will prove the theorem when is small. Thus, we need only consider the case when is large, say. Suppose that there are m lines that each contain at least points. These lines generate at least incidences, and so by the first formulation of the Szemerédi–Trotter theorem, we have and so at least one of the statements, or is true. The third possibility is ruled out since was assumed to be large, so we are left with the first two. But in either of these two cases, some elementary algebra will give the bound as desired.
Optimality
Except for its constant, the Szemerédi–Trotter incidence bound cannot be improved. To see this, consider for any positive integer a set of points on the integer lattice and a set of lines Clearly, and. Since each line is incident to points, the number of incidences is which matches the upper bound.
Generalization to
One generalization of this result to arbitrary dimension,, was found by Agarwal and Aronov. Given a set of points,, and the set of hyperplanes,, which are each spanned by, the number of incidences between and is bounded above by Equivalently, the number of hyperplanes in containing or more points is bounded above by A construction due to Edelsbrunner shows this bound to be asymptotically optimal. József Solymosi and Terence Tao obtained near sharp upper bounds for the number of incidences between points and algebraic varieties in higher dimensions, when the points and varieties satisfy "certain pseudo-line type axioms". Their proof uses the Polynomial Ham Sandwich Theorem.
Analogs over other fields
There has been some interest in proving analogs to the Szemerédi–Trotter theorem in planes over fields other than. All known proofs of the Szemerédi–Trotter theorem over rely in a crucial way on the topology of Euclidean space, so do not extend easily to other fields. Nevertheless, the following results have been obtained:
Tóth successfully generalized the original proof of Szemerédi and Trotter to the complex plane by introducing additional ideas. This result was also obtained independently and through a different method by Zahl.