Flexion Framework is a unified structural theory for describing how systems remain viable, lose reversibility, and collapse. It does not model behavior or outcomes — it models the structural state that determines whether recovery is still possible.
Any system — biological, economic, technical, or informational — can be represented as a living structural state evolving under constraints. The framework provides one language for stability, drift, irreversibility, and collapse boundaries, independent of domain.
Collapse is treated as a structural event: once reversibility is lost and κ approaches the boundary, no intervention can restore the previous regime.
Foundational structural framework defining the living state and invariants.
Structural reversal and termination regimes: when recovery becomes impossible.
Curved structural manifold for X and the geometry of viable regions.
Time defined structurally: as memory accumulation and loss of viability.
Structural evolution in X: stability, drift, reversibility, termination, constraints.
Structural fields and interaction gradients governing coupled evolution.
Structural origin of deviation, memory, and time from symmetry loss.
Structural coupling: shared time, co-evolution, and irreversible mutual influence.
Structural termination: collapse geometry and irreversible breakdown regimes.
Intelligence as viability-preserving navigation in curved state space under constraints.
Observer as structural boundary: measurement, memory anchoring, and collapse selection.