frontiers / frontier
e1271/1271 · statement.attested · reviewer:will-blair · 2026-06-10 · null→null
Reviewable change
back to reviewErdős Problem #142 remains OPEN. Statement: Prove an asymptotic formula for $r_k(N)$, the largest possible size of a subset of $\{1, \dots, N\}$ that does not contain any non-trivial $k$-term arithmetic progression. Topics: additive combinatorics, arithmetic progressions. Erdős prize: $10000. Statement is machine-verified in Lean (formal-conjectures). OEIS: A003002, A003003, A003004, A003005.
A proposal; no authority until an accepted review event.
accept gate
0 of 4 on recordtimeline
vpr_4e8c391a3f233eabSEMANTIC-EDGE DRAFT -> Erdos #139 (vf_29ab904190a2f3db) [related, confidence 0.85]: Both concern r_k(N), the largest AP-free subset of {1,...,N}; 139 states the bound problem while 142 asks specifically for an asymptotic formula for the same quantity. -- LLM-drafted (20-agent extraction, 2026-06); NOT adjudicated. Accept or reject via `vela proposals accept/reject` under reviewer authority.proposed
reason
SEMANTIC-EDGE DRAFT -> Erdos #139 (vf_29ab904190a2f3db) [related, confidence 0.85]: Both concern r_k(N), the largest AP-free subset of {1,...,N}; 139 states the bound problem while 142 asks specifically for an asymptotic formula for the same quantity. -- LLM-drafted (20-agent extraction, 2026-06); NOT adjudicated. Accept or reject via `vela proposals accept/reject` under reviewer authority.
provenance
proposed by
agent:semantic-edge-extractor
actor type
human
created at
2026-06-10
target type
finding
affected
inspect finding →Erdős Problem #142 remains OPEN. Statement: Prove an asymptotic formula for $r_k(N)$, the largest possible size of a subset of $\{1, \dots, N\}$ that does not contain any non-trivial $k$-term arithmetic progression. Topics: additive combinatorics, arithmetic progressions. Erdős prize: $10000. Statement is machine-verified in Lean (formal-conjectures). OEIS: A003002, A003003, A003004, A003005.
vf_b66b7c5d84d7554eRead-only frontier; diff not recomputed.
Erdős problems frontier receives a reviewable source, finding, caveat, replication, evaluation, or proof-affecting edit.
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