Scaling Properties of the Lorenz System and Dissipative Nambu Mechanics

Abstract

In the framework of Nambu Mechanics, we have recently argued that Non-Hamiltonian Chaotic Flows in R3 , are dissipation induced deformations, of integrable volume preserving flows, specified by pairs of Intersecting Surfaces in R3. In the present work we focus our attention to the Lorenz system with a linear dissipative sector in its phase space dynamics. In this case the Intersecting Surfaces are Quadratic. We parametrize its dissipation strength through a continuous control parameter ε, acting homogeneously over the whole 3-dim. phase space. In the extended ε-Lorenz system we find a scaling relation between the dissipation strength ε and Reynolds number parameter r . It results from the scale covariance, we impose on the Lorenz equations under arbitrary rescalings of all its dynamical coordinates. Its integrable limit, ( ε = 0 , \ fixed r), which is described in terms of intersecting Quadratic Nambu "Hamiltonians" Surfaces, gets mapped on the infinite value limit of the Reynolds number parameter (r → ∞,\ ε= 1). In effect weak dissipation, through small ε values, generates and controls the well explored Route to Chaos in the large r-value regime. The non-dissipative ε=0 integrable limit is therefore the gateway to Chaos for the Lorenz system.