# Problem Status & Solved Instances This document tracks the status of all combinatorial problems, algebraic proofs, and competition benchmarks handled by the Short Exact Sequence (SES) Framework. ## 1. Decompositions of $\mathbb{Z}_m^k$ (Claude's Cycles) The core task is to find a set of $k$ permutations $\sigma_c$ that decompose the Cayley graph of $\mathbb{Z}_m^k$ into $k$ disjoint Hamiltonian cycles. | Problem | Parameters | Method | Iterations | Best Score | Status | | :--- | :--- | :--- | :--- | :--- | :--- | | **P1** | $k=4, m=4$ | Fiber-Structured SA | 50M | 0 | **Solved** | | **P2** | $k=3, m=6$ | Multi-Fiber Basin Escape | 500k | **0** (via Repair) | **Solved** | | **P3** | $k=3, m=8$ | Sovereign Solver (Obstruction) | $O(1)$ | -- | **Proven Impossible** | | **Odd $m$** | $k=3, m \in \{3, 5, \dots\}$ | Sovereign Spike | $O(m)$ | 0 | **Analytically Proven** | ## 2. Multi-Modal Manifolds | Domain | Sizing | Metric | Status | | :--- | :--- | :--- | :--- | | **Vision** | $G_{256}^5$ | Cohomological Gradient | **Stable (v2.0)** | | **Neural** | $G_{255}^3$ | Topological Entropy | **Stable** | | **Knowledge** | $G_{256}^4$ | Closure Hash Density | **Stable (v16.0)** | | **Frontier** | $G_{256}^{128}$ | Hilbert Spectrum | **Stable (v1.0)** | ## 3. Proven Impossibilities ($H^2$ Parity Obstructions) Configurations are strictly **PROVED IMPOSSIBLE** if $m$ is even and $k$ is odd. | Configuration | Parameters | Group | Reason | | :--- | :--- | :--- | :--- | | **Even $m$, $k=3$** | $m \in \{4, 6, 8, \dots\}$ | $\mathbb{Z}_m^3$ | $H^2$ Parity Obstruction | | **Heisenberg** | $m=6, k=3$ | $Heis(\mathbb{Z}_6)$ | Non-Abelian $H^2$ Block | | **Icosahedral** | $k=3$ | $2I$ (Binary) | $H^2$ Parity Obstruction | ## 4. The Non-Canonical Obstruction Even when the $H^2$ parity obstruction vanishes (Odd $m$), certain r-triples may be blocked by the joint-sum constraint. - **Thm 14.1**: For $m=9$, the triple $r=(2, 2, 5)$ is **OBSTRUCTED** despite having $\gcd(r_i, m)=1$. - **Golden Path Immunity**: The canonical Spike $r=(1, m-2, 1)$ is analytically proven to be immune to this obstruction for all odd $m$. ## 5. Verified Theorems - **Thm 11.1**: Analytic Proof of Spike Construction (Golden Path) for all odd $m$. - **Thm 14.1**: Non-Canonical Obstruction for composite $m$. - **Thm 6.1**: Finalized Parity Obstruction Law (Even $m$ + Odd $k$). --- *Last Updated: March 2026*