Incidence bounds on multijoints and generic joints

Abstract

A point x ∈ Fn is a joint formed by a finite collection L of lines in Fn if there exist at least n lines in L through x that span Fn. It is known that there are n |L|nn-1 joints formed by L. We say that a point x ∈ Fn is a multijoint formed by the finite collections L1,…,Ln of lines in Fn if there exist at least n lines through x, one from each collection, spanning Fn. We show that there are n (|L1|·s |Ln|)1n-1 such points for any field F and n=3, as well as for F=R and any n ≥ 3. Moreover, we say that a point x ∈ Fn is a generic joint formed by a finite collection L of lines in Fn if each n lines of L through x form a joint there. We show that, for F=R and any n ≥ 3, there are n |L|nn-1kn+1n-1+|L|k generic joints formed by L, each lying in k lines of L. This result generalises, to all dimensions, a (very small) part of the main point-line incidence theorem in R3 in GuthKatz2010 by Guth and Katz. Finally, we generalise our results in Rn to the case of multijoints and generic joints formed by real algebraic curves.