Jeong Han Kim, Ben Lund, Thang Pham, Semin Yoo
Published 2022-03-24Version 1
The main purpose of this paper is to provide threshold functions for the events that a random subset of the points of a finite vector space has certain properties related to point-flat incidences. Specifically, we consider the events that there is an $\ell$-rich $m$-flat with regard to a random set of points in $\mathbb{F}_q^n$, the event that a random set of points is an $m$-blocking set, and the event that there is an incidence between a random set of points and a random set of $m$-flats. One of our key ingredients is a stronger version of a recent result obtained by Chen and Greenhill (2021).
Counting subspaces of a finite vector space
Singularity of $\{\pm 1\}$-matrices and asymptotics of the number of threshold functions
A Lower Bound of the Number of Threshold Functions in Terms of Combinatorial Flags on the Boolean Cube
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