Incidences between points on a variety and planes in R3

Abstract

In this paper we establish an improved bound for the number of incidences between a set P of m points and a set H of n planes in R3, provided that the points lie on a two-dimensional nonlinear irreducible algebraic variety V of constant degree. Specifically, the bound is O( m2/3n2/3 + m6/11n9/11β(m3/n) + m + n + Σ |P|· |H| ) , where the constant of proportionality and the constant exponent β depend on the degree of V, and where the sum ranges over all lines that are fully contained in V and contain at least one point of P, so that, for each such , P = P and H is the set of the planes of H that contain . In addition, Σ |P| = O(m) and Σ |H| = O(n). This improves, for this special case, the earlier more general bound of Apfelbaum and Sharir (see also Brass and Knauer as well as Elekes and T\'oth). This is a generalization of the incidence bound for points and circles in the plane (cf. Aronov et al., Aronov and Sharir, Marcus and Tardos), and is based on a recent result of Sharir and Zahl on the number of cuts that turn a collection of algebraic curves into pseudo-segments. The case where V is a quadric is simpler to analyze, does not require the result of Sharir and Zahl, and yields the same bound as above, with β=2/11. We present an interesting application of our results to a problem, studied by Rudnev, on obtaining a lower bound on the number of distinct cross-ratios determined by n real points, where our bound leads to a slight improvement in Rudnev's bound.