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1. 2026-06-10proposeproposed · finding.noteagent:semantic-edge-extractorvpr_7ef037714e22c815SEMANTIC-EDGE DRAFT -> Erdos #982 (vf_ede0b0cddd2bbaab) [related, confidence 0.6]: Problem 982's claim that some vertex of a convex n-gon realizes at least floor(n/2) distinct distances is a convex-position instance of the general-position distinct-distance question quantified in 98's h(n). -- LLM-drafted (20-agent extraction, 2026-06); NOT adjudicated. Accept or reject via `vela proposals accept/reject` under reviewer authority.

Erdős Problem #98 remains OPEN. Statement: Let $h(n)$ be such that any $n$ points in $\mathbb{R}^2$, with no three on a line and no four on a circle, determine at least $h(n)$ distinct distances. Does $h(n)/n\to \infty$? Topics: geometry, distances. Erdős prize: no. Statement is machine-verified in Lean (formal-conjectures). OEIS: possible.