Stratified Cohomological Quantum Codes via Colimits in Ch(R)

Abstract

We introduce stratified colimit codes: stabiliser codes obtained by taking the degree-wise colimit C(X):=*colimσ∈ XF(σ) of a functor F XCh(R) from a finite poset into the category of chain complexes over a commutative ring~R. Axioms requiring only transitivity and boundary-compatibility of the morphisms in F ensure that ∂2=0, so the homology H and cohomology H furnish the usual CSS Z- and X-type logical sectors; torsion in H classifies qudit charges via the universal coefficient sequence. Varying F recovers classical surface and color codes, RP2 torsion codes, twisted toric families with rate k d, and X-cube style fracton models, all without referencing an ambient cell complex. Matrix Smith normal form (PID case) and sparse Gaussian elimination (field case) compute H directly, giving LDPC parameters that inherit the sparsity of F. Because the construction is ring agnostic and functorial, it extends naturally to code surgery (push-outs) and, at the next categorical level, to bicomplex domain walls. Stratified colimit codes therefore supply a concise algebraic chassis for designing, classifying, and decoding topological and fractal quantum codes without ever drawing a lattice.