TricriticalPotts3 — model index
Tricritical 3-state Potts CFT — the unitary Virasoro minimal model M(6, 7), realised on the lattice by Andrews-Baxter-Forrester (1984) RSOS models and by the q = 3 Potts model with dilution (Huse 1984).
Generated by docs/atlas/generate.jl — a pure VIEW over the *_registry.jl claims + the static test/INVENTORY.jsonl AST scan. No test is executed and no src is run; test/INVENTORY.jsonl is regenerated in-place (idempotently) from that static scan; fetch/@register untouched. Assurance labels are PROVISIONAL: residuals / confidence are not shown yet (RES not wired). Badges reflect the committed test AST, not the latest CI run — a hub can read green while its @test is red between regenerations. @sweep = a graceful regime-resolution gap, not card omission.
All (Quantity, BC) hubs src claims for TricriticalPotts3. Cells link to the per-hub card; — = not yet implemented at that BC. The shape of the matrix is the gap visualisation: empty cells are where physics could be added next.
Convention
| Field | Value |
|---|---|
| Hamiltonian | see file-header description above |
| Observable | per src/core/quantities.jl (matches the dispatch tag) |
| Reference | docs/src/conventions.md (project-wide convention policy) |
| STATUS | backfilled by PR (audit gate); per-field domain content |
Coverage
| Level | Count |
|---|---|
| 🟣 universality-corroborated | 0 |
| 🟢 corroborated-at-p | 2 |
| 🔵 coherent | 0 |
| ⚪ cited-only | 0 |
| 🟠 uncorroborated-but-feasible | 2 |
| total claimed hubs | 4 |
Methods (from @register, derived): analytic, minimal_model_delegation
Quantity × BC matrix
| Quantity | Infinite |
|---|---|
CentralCharge | 🟢 hub |
ConformalWeights | 🟢 hub |
PrimaryFields | 🟠 hub |
UniversalityClass | 🟠 hub |
References
Papers cited by this model's @register cards. The full numbered list is on the Reference List.
- [27]
- G. E. Andrews, R. J. Baxter and P. J. Forrester. Eight-vertex SOS model and generalized Rogers-Ramanujan-type identities. Journal of Statistical Physics 35, 193–266 (1984).
- [28]
- A. Belavin, A. Polyakov and A. Zamolodchikov. Infinite conformal symmetry in two-dimensional quantum field theory. Nuclear Physics B 241, 333–380 (1984).
- [29]
- D. A. Huse. Exact exponents for infinitely many new multicritical points. Physical Review B 30, 3908–3915 (1984).