evidence boundary
supportsfrontiers / frontier
Erdős problems frontier
- id
- vfr_37aec80d874a0239
- license
- CC-BY-4.0
- findings
- 1,256
- accepted core
- 6
- contested
- 0
- links
- 17
- sources
- 1,234
- evidence
- 1,256
- avg conf
- 0.98
e1288/1288 · statement.registered · agent:claude-proxy · 2026-06-10 · null→null
Evidence atom
back to sources{"artifact_id":"va_9bc926d75e4e3881","artifact_packet_id":"cap_61973ee16b553d57","candidate_claim_id":"vc_ff7fe785e18e4d60"}
- id
- vea_e71d6fd01dacf940
- frontier
- Erdős problems frontier
- source
- vs_45b66abf7b05f068
- finding
- vf_7cac7324cc718aeb
finding binding
boundopen_question
Erdős Problem #303 has status 'proved (lean)'. Statement: Is it true that in any finite colouring of the integers there exists a monochromatic solution to $\frac 1 a = \frac 1 b + \frac 1 c$ with distinct $a, b, c$? This is true, as proved by Brown and Rödl [BrRo91]. This was formalized in Lean by Yuan using Seed-Prover. Topics: number theory, unit fractions. Erdős prize: no. Statement is machine-verified in Lean (formal-conjectures). OEIS: N/A.
source binding
source-boundcap_61973ee16b553d57 · vc_ff7fe785e18e4d60
vs_45b66abf7b05f068
review context
unverified1 events
1 reviewable changes and 0 evaluation records target this atom or its bound objects.
statement
{"artifact_id":"va_9bc926d75e4e3881","artifact_packet_id":"cap_61973ee16b553d57","candidate_claim_id":"vc_ff7fe785e18e4d60"}
locator
span:0
extraction method
artifact_to_state_import
support relation
supports
condition refs
vcnd_9a03d688817e8771
caveats
No caveats recorded.
Review, event, and evaluation records
2events
vev_c04f55d028db08b5finding.assertedCandidate claim vc_ff7fe785e18e4d60 imported from artifact packet cap_61973ee16b553d57
reviewer:erdos-db-trust · 2026-05-30
reviewable changes
vpr_b432099eb20ea390finding.addCandidate claim vc_ff7fe785e18e4d60 imported from artifact packet cap_61973ee16b553d57
applied · agent:erdos-spine-ingest · 2026-05-30
evaluations
No evaluation rows are attached.