--- name: graph-grafting description: Graph Grafting Skill version: 1.0.0 --- # Graph Grafting Skill **Trit**: 0 (ERGODIC - Coordinator) **GF(3) Triad**: `queryable (-1) ⊗ graftable (0) ⊗ derangeable (+1) = 0` ## Overview Combinatorial complex operations replacing GraphQL with pure graph theory: | Operation | Trit | Description | |-----------|------|-------------| | **Queryable** | -1 | Tree-shape decision via bag decomposition | | **Colorable** | 0 | GF(3) 3-coloring via sheaf | | **Derangeable** | +1 | Permutations with no fixed points | | **Graftable** | 0 | Attach rooted tree at vertex | ## Mathematical Foundation **Grafting** = attaching a rooted tree T at vertex v of graph G: ``` Graft(T, v, G) → G' where: - V(G') = V(G) ∪ V(T) - E(G') = E(G) ∪ E(T) ∪ {(v, root(T))} - Adhesion = shared labels at attachment point ``` ## Quadrant Chart: Colorable × Derangeable ``` Balanced (GF3=0) │ Q2 │ Q1 ← OPTIMAL Identity │ PR#18, Knight Tour │ SICM Galois ──────────────┼────────────── Q3 │ Q4 Deadlock │ Phase Trans │ Fixed Points → Derangement ``` ## Usage ```julia using .GraphGrafting c = GraftComplex(UInt64(1069)) # Build PR tree root = GraftNode(:pr18, Int8(0), :golden, 0) alice = GraftNode(:alice, Int8(-1), :baseline, 1) bob = GraftNode(:bob, Int8(1), :original, 1) # Graft nodes graft!(c, root, :none, String[]) graft!(c, alice, :pr18, ["aptos-wallet-mcp"]) graft!(c, bob, :pr18, ["aptos-wallet-mcp"]) # Operations tree_shape(c) # Queryable trit_partition(c) # Colorable derange!(c) # Derangeable compose(c1, c2, :vertex) # Graftable # Verify verify_gf3(c) # → (conserved=true, sum=0) ``` ## Neighbors ### High Affinity - `three-match` (-1): Graph coloring verification - `derangeable` (+1): No fixed points - `bisimulation-game` (-1): Attacker/Defender ### Example Triad ```yaml skills: [graph-grafting, three-match, derangeable] sum: (0) + (-1) + (+1) = 0 ✓ CONSERVED ``` ## References - Joyal, Combinatorial Species (1981) - Flajolet & Sedgewick, Analytic Combinatorics (2009) - Topos Institute, Observational Bridge Types ## Scientific Skill Interleaving This skill connects to the K-Dense-AI/claude-scientific-skills ecosystem: ### Graph Theory - **networkx** [○] via bicomodule - Graph manipulation and algorithms ### Bibliography References - `graph-theory`: 38 citations in bib.duckdb ## SDF Interleaving This skill connects to **Software Design for Flexibility** (Hanson & Sussman, 2021): ### Primary Chapter: 1. Flexibility through Abstraction **Concepts**: combinators, compose, parallel-combine, spread-combine, arity ### GF(3) Balanced Triad ``` graph-grafting (−) + SDF.Ch1 (+) + [balancer] (○) = 0 ``` **Skill Trit**: -1 (MINUS - verification) ### Secondary Chapters - Ch4: Pattern Matching - Ch10: Adventure Game Example ### Connection Pattern Combinators compose operations. This skill provides composable abstractions. ## Cat# Integration This skill maps to **Cat# = Comod(P)** as a bicomodule in the equipment structure: ``` Trit: 0 (ERGODIC) Home: Prof Poly Op: ⊗ Kan Role: Adj Color: #26D826 ``` ### GF(3) Naturality The skill participates in triads satisfying: ``` (-1) + (0) + (+1) ≡ 0 (mod 3) ``` This ensures compositional coherence in the Cat# equipment structure.