Let $h (n)$ be such that any $n$ points in $R^{2}$ , with no three on a line and no four on a circle, determine at least $h (n)$ distinct distances. Does $h (n) / n \to \infty$ ?

unreviewedOpen. Worked here; no verified result yet.

geometry · open · possible · formalized (Lean) · 0 attempts

machinery: geometric,distinct-distances,general-position-no-3-collinear-no-4-cocyclic,incidence-geometry,asymptotic-growth-lower-bound,extremal-combinatorial-geometry

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Evidence

unverified AI candidates (2)

gpt-erdos · GPT-5.2 Pro + Deep Research · unverified

People usually write your function as [ D_{\text{gen}}(n)=\min{#\text{distinct distances determined by }n\text{ points in }\mathbb R^2\text{ in general position}}, ] where “general position” means **no three collinear and no four cocircular** (same as in your question). It is *not known* whether (D_{\text{gen}}(n)) is …

candidate solution ↗

llm-hunter · gpt 5.2, gpt pro 5.2 · unverified

2 LLM attack(s) recorded (gpt 5.2, gpt pro 5.2); unverified.

candidate solution ↗

Formal proof

AMS 52 · open (literature)

theorem erdos_98 :
    answer(sorry) ↔ Tendsto (fun n : ℕ ↦ ((h n : ℝ) / (n : ℝ))) atTop atTop

formal-conjectures/98.lean ↗

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