Lower bounds for incidences with hypersurfaces

Abstract

We present a technique for deriving lower bounds for incidences with hypersurfaces in Rd with d 4. These bounds apply to a large variety of hypersurfaces, such as hyperplanes, hyperspheres, paraboloids, and hypersurfaces of any degree. Beyond being the first non-trivial lower bounds for various incidence problems, our bounds show that some of the known upper bounds for incidence problems in Rd are tight up to an extra in the exponent. Specifically, for every m, d 4, and >0 there exist m points and n hypersurfaces in Rd (where n depends on m) with no K2,d-1 in the incidence graph and (m(2d-2)/(2d-1)nd/(2d-1)- ) incidences. Moreover, we provide improved lower bounds for the case of no Ks,s in the incidence graph, for large constants s. Our analysis builds upon ideas from a recent work of Bourgain and Demeter on discrete Fourier restriction to the four- and five-dimensional spheres. Specifically, it is based on studying the additive energy of the integer points in a truncated paraboloid.