Coulon Spine Invariants formalize the preservation of structure in topological manifolds under continuous and discrete flows. By combining lambda calculus, minimal Lisp functionals, symplectic geometry, and categorical reasoning, we define invariant subspaces (the Coulon Spine) that encode stability across parameter deformations.

The framework establishes a rigorous methodology for constructing, analyzing, and applying these invariants in computational, geometric, and pragmatic domains.

Coulon Spine Invariants formalize the preservation of structure in topological manifolds under continuous and discrete flows. By combining lambda calculus, minimal Lisp functionals, symplectic geometry, and categorical reasoning, we define invariant subspaces (the Coulon Spine) that encode stability across parameter deformations. 

The framework establishes a rigorous methodology for constructing, analyzing, and applying these invariants in computational, geometric, and pragmatic domains.