From Phase Space to Non-Equilibrium Dynamics: Exploring Liouville's Theorem and its Implications

Abstract: The Liouville theorem is a fundamental concept in understanding the properties of systems that adhere to Hamilton's equations. However, the traditional notion of the theorem may not always apply. Specifically, when the entropy gradient in phase space fails to reach equilibrium, the phase-space density may not have a zero time derivative, i.e., $\frac{d\rho}{dt}$ may not be zero. This leads to the concept of the set of attainable states of a system forming a compressible "fluid" in phase space. This observation provides additional insights into Hamiltonian dynamics and suggests further examination in the fields of statistical physics and fluid dynamics. In fact, this finding sheds light on the limitations of the Liouville theorem and has practical applications in fields such as beam stacking, stochastic cooling, and Rabi oscillations, among others.