Theory of Entropicity (ToE)

Monograph Chapter Notes

3. Obidi Action Principle

Here, the classical principle of least action is reimagined in entropic terms. The Obidi Action Principle replaces the traditional action functional with an entropic curvature functional, asserting that physical systems evolve along trajectories of least entropic resistance. This chapter derives the corresponding Euler–Lagrange equations for the entropic field and shows how familiar dynamical laws can be recovered or generalized within this framework. It is the bridge between entropic ontology and concrete dynamical equations.