A General Incidence Bound in Rd and Related Problems

Abstract

We derive a general upper bound for the number of incidences with k-dimensional varieties in Rd. The leading term of this new bound generalizes previous bounds for the special cases of k=1, k=d-1, and k= d/2, to every 1 k <d. We derive lower bounds showing that this leading term is tight in various cases. We derive a bound for incidences with transverse varieties, generalizing a result of Solymosi and Tao. Finally, we derive a bound for incidences with hyperplanes in Cd, which is also tight in some cases. (In both Rd and Cd, the bounds are tight up to sub-polynomial factors.) To prove our incidence bounds, we define the dimension ratio of an incidence problem. This ratio provides an intuitive approach for deriving incidence bounds and isolating the main difficulties in each proof. We rely on the dimension ratio both in Rd and in Cd, and also in some of our lower bounds.