Incidences between quadratic subspaces over finite fields

Abstract

Let Fq be a finite field of order q, where q is an odd prime power. A quadratic subspace (W,Q) of (Fqn,x12+x22+·s+xn2) is called dotk-subspace if Q is isometrically isomorphic to x12+x22+·s+xk2. In this paper, we obtain bounds for the number of incidences I(K,H) between a collection K of dotk-subspaces and a collection H of doth-subspaces when h ≥ 4k-4, which is given by \[ | I(K,H)-|K||H|qk(n-h) | qk(2h-n-2k+4)+h(n-h-1)-22|K||H|. \] In particular, we improve the error term obtained by Phuong, Thang and Vinh (2019) for general collections of affine subspaces in the presence of our additional conditions.