Universal Response Inequalities Beyond Steady States via Trajectory Information Geometry

Referee: 'Globally orthogonal coordinate system defined by transition rates' should be qualified — diagonality follows from channel independence of the inhomogeneous Poisson path likelihood, not from a deep global-geometry result. Reserve 'global' language for properties that genuinely require curvature/holonomy arguments.

Authors: We agree. The diagonality of the Fisher metric in the rate parameterization is a direct consequence of the factorization of the path measure into independent inhomogeneous-Poisson contributions per (x→y, t) channel, and does not invoke curvature or holonomy. We used 'globally orthogonal' in the descriptive sense that the coordinates remain orthogonal at every point of the manifold (i.e., the metric is diagonal everywhere, not merely at a reference point), but we acknowledge this phrasing conflates a parameterization fact with a geometric one. In the revision we will (a) replace 'globally orthogonal coordinate system' with 'channel-independent (Poisson-factorized) parameterization in which the Fisher metric is diagonal everywhere', (b) give the one-line derivation of diagonality from the path likelihood up front, and (c) reserve 'global' for the geodesic / finite-distance statements, which do depend on integrating the metric along curves and are genuinely non-local in the parameter manifold even though the metric itself is diagonal. revision: yes

Referee: Physical perturbations move many rates simultaneously via local detailed balance / Arrhenius constraints, so they live on a low-dimensional submanifold. State whether the bound uses the ambient or induced metric, and characterize when it is tight vs. loose.

Authors: This is a fair and important point. The Cramér–Rao inequality we derive is in the ambient rate manifold, and it remains valid when restricted to any smooth submanifold M_phys defined by physical constraints (local detailed balance, Arrhenius form, shared control parameter λ): pulling the score and the metric back to M_phys gives a bound of the same form with the induced metric, while the ambient bound is recovered by ignoring the constraint and is therefore generally looser. Saturation requires the score for the observable to be parallel to the constrained perturbation direction, which holds generically only when the observable is itself the conjugate current of the control parameter (the standard Onsager/FDT alignment); for generic observables and generic physical controls the bound is loose, with the looseness quantified by the angle between the observable's gradient and the tangent space of M_phys in the Fisher metric. In the revision we will (i) state explicitly that the inequality as written uses the ambient metric and is therefore a valid but generally non-tight bound on response to constrained physical controls, (ii) give the induced-metric version with the corresponding tightened constant, and (iii) add a worked example (driven two-state system with Arrhenius rates controlled by a single temperature) showing both the loose ambient and the tight induced bounds and the gap between them. revision: yes

Referee: The ambient geodesic between two rate fields will generically leave any physical submanifold, so the ambient geodesic length is only a lower bound on the intrinsic geodesic length. Clarify whether the bound is a useful upper bound on response or merely a loose one.

Authors: The referee has correctly identified the subtlety. The geodesic length we compute is the ambient one, and because M_phys is a (typically curved) submanifold, the intrinsic geodesic between two physically realizable rate fields is at least as long as the ambient geodesic. Our inequality has the schematic form |ΔO| ≤ f(L) with f monotone in geodesic length L, so using the ambient L gives the strongest (smallest-RHS) bound but at distributions that may not be physically reachable along constrained trajectories; using the intrinsic L_phys ≥ L gives a weaker but physically attainable bound. Both are valid upper bounds on response between the endpoint distributions; the ambient one is what one wants when only the endpoint trajectory distributions matter (and intermediate rates are unconstrained, e.g., in optimal-control / Monge–Kantorovich-style design problems), while the intrinsic one is appropriate when the experimenter is restricted to a physical control submanifold throughout. We will (i) make this distinction explicit, (ii) state the bound in both forms, (iii) note that for the design-principle applications we emphasize (engineered responsive systems where rate landscapes can be shaped) the ambient bound is the operationally relevant one, and (iv) caution that for fixed physical control protocols the intrinsic bound, though looser, is the correct one. We do not claim — and will not claim — that the ambient geodesic bound is tight against arbitrary constrained protocols. revision: yes

Referee: Add an explicit table/appendix mapping each cited prior inequality (TUR variants, Dechant–Sasa, Aslyamov–Esposito, etc.) to the specific specialization under which the present bound reduces to it, step by step, to distinguish genuine extension from relabeling.

Authors: We agree this is necessary, and we welcome the chance to make the reductions transparent. The revision will include an appendix table with one row per prior inequality, listing: the original statement, the choice of observable (e.g., time-integrated current vs. counting observable), the stationarity assumption (steady state vs. time-dependent rates), the perturbation class, and the explicit substitution that reduces our bound to the cited one. We will be candid where a 'recovery' is essentially a reparameterization of the same Poisson-factorized Fisher information (e.g., several activity-based TURs), and reserve the language of 'extension' for cases where our bound is strictly stronger or applies in regimes the original did not cover (non-stationary observables, time-dependent driving without a steady-state reference). We also agree to soften 'encompasses or anticipates' in the abstract to a more precise statement about which prior bounds are recovered as exact specializations and which are extended. revision: yes