Procedural Cosmology in 9 Dimensions: The Adinkra-Stabilized Hypercube Model (ASH Model)

The Adinkra-Stabilized Hypercube Model (ASH Model) is a procedural cosmology frame- work that embeds supersymmetric adinkra graphs and doubly-even self-dual error-correcting codes within a 9-dimensional hypercube. Each of the 512 vertices represents a distinct cos- mological realm encoded as a binary string of length nine. Through mathematical analysis and agent-based simulations, the model exhibits emer- gent stability, robust error correction under random bit-flip noise, and rapid convergence to Gaussian (bell-curve) occupancy distributions across Hamming weight planes. Lindenmayer- system (L-System) branching generates fractal patterns analogous to quantum decoherence trees, providing a computational visualisation of the Many-Worlds Interpretation. The recurrence of nine dimensions is mathematically motivated by connections to string theory anomaly cancellation, optimal lattice packing (E8 and Leech lattices), and coding theory. A modal-logic foundation is provided by five axioms of existence formalised in Kripke-frame semantics (detailed in axioms-of-existence.json), establishing relational ontology, structural compressibility, multi-scale persistence, energetic cost of erasure, and self-reference as the basis for consciousness. While classical and discrete, the model offers a computationally tractable platform for exploring the intersection of supersymmetry, coding theory, high-dimensional geometry, and cosmological structure. Future extensions will incorporate genuine quantum amplitudes, richer SUSY multiplets, tensor networks, and comparative studies in neighbouring dimen- sions.