A quantitative information-theoretic framework for characterising entropy propagation and computational irreducibility across decision trajectories in artificial neural networks.
This paper introduces Irreducible Path Entropy (Hpath), a quantitative metric for characterising the structural accumulation and reducibility of entropy across computational decision trajectories in artificial neural networks.
The construct is grounded exclusively in information-theoretic and systems-level analysis — without recourse to semantic, cognitive, or anthropomorphic assumptions.
H_path(l) = −Σ p_{l,k} log p_{l,k}H_path^(L) = Σ H(P_l)I(h_l; M_l(y)) ≥ H_path(l) − δ*H_irr = H_path − H_redΩ = 1 − H_irr / H_pathΔ(L) = H_path − I(x; h_L)