A Szemeredi-Trotter type theorem in R4

Abstract

We show that m points and n two-dimensional algebraic surfaces in R4 can have at most O(mk2k-1n2k-22k-1+m+n) incidences, provided that the algebraic surfaces behave like pseudoflats with k degrees of freedom, and that m≤ n2k+23k. As a special case, we obtain a Szemer\'edi-Trotter type theorem for 2--planes in R4, provided m≤ n and the planes intersect transversely. As a further special case, we obtain a Szemer\'edi-Trotter type theorem for complex lines in C2 with no restrictions on m and n (this theorem was originally proved by T\'oth using a different method). As a third special case, we obtain a Szemer\'edi-Trotter type theorem for complex unit circles in C2. We obtain our results by combining several tools, including a two-level analogue of the discrete polynomial partitioning theorem and the crossing lemma.