{"schema":"vela.problem-packet.v0.1","problem":960,"statement":"Let $r,k\\geq 2$ be fixed. Let $A\\subset \\mathbb{R}^2$ be a set of $n$ points with no $k$ points on a line. Determine the threshold $f_{r,k}(n)$ such that if there are at least $f_{r,k}(n)$ many ordinary lines (lines containing exactly two points) then there is a set $A'\\subseteq A$ of $r$ points such that all $\\binom{r}{2}$ many lines determined by $A'$ are ordinary.Is it true that $f_{r,k}(n)=o(n^2)$, or perhaps even $\\ll n$?","status":"solved","seam":"raw","closureRoutes":[],"obligations":[],"attestations":[],"attempts":[],"velaLean":[],"oeis":[],"generated_note":"derived view; the signed event log is the source of truth (vela check / vela reproduce)"}