Part I: Foundations

The Free Energy Landscape

Introduction

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The Free Energy Landscape

For systems amenable to such analysis, one can define an effective free energy functional:

\mathcal{F}[\mathbf{x}] = U[\mathbf{x}] - T \cdot S[\mathbf{x}] + \text{(non-equilibrium corrections)}

where $U$ captures internal energy, $S$ entropy, and $T$ an effective temperature. The dynamics can often be written as:

\frac{d\mathbf{x}}{dt} = -\Gamma \cdot \nabla_\mathbf{x} \mathcal{F}[\mathbf{x}] + \bm{\eta}(t)

for some positive-definite mobility tensor $\Gamma$ . In this representation:

Local minima of $\mathcal{F}$ correspond to metastable attractors
Saddle points determine transition rates between attractors
The depth of minima relative to barriers determines persistence times

One structure within this landscape will recur throughout the book. For a self-maintaining system, the viability manifold $\viable \subset \R^n$ is the region of state space within which the system can persist indefinitely (or for times long relative to observation scales):

\viable = \left\{ \mathbf{x} \in \R^n : \E\left[\tau_{\text{exit}}(\mathbf{x})\right] > T_{\text{threshold}} \right\}

where $\tau_{\text{exit}}(\mathbf{x})$ is the first passage time to a dissolution state starting from $\mathbf{x}$ .

The viability manifold will play a central role in understanding normativity: trajectories that remain within $\viable$ are, in a precise sense, “good” for the system, while trajectories that approach the boundary $\partial\viable$ are “bad.”

Viability Theory

The viability manifold concept connects to Aubin’s viability theory (1991), which provides mathematical tools for analyzing systems that must satisfy state constraints over time. Key results:

A state is viable iff there exists at least one trajectory remaining in $\viable$ forever
The viability kernel is the largest subset from which viable trajectories exist
For controlled systems, viability requires the control to “point inward” at boundaries

I’ll add stochasticity and connect viability to phenomenology: the felt sense of threat corresponds to proximity to $\partial\viable$ .