Semiquantum Chaos and the Large N Expansion

Abstract

We consider the dynamical system consisting of a quantum degree of freedom A interacting with N quantum oscillators described by the Lagrangian L = 1 2A2 + Σi=1N \1 2xi2 - 1 2( m2 + e2 A2)xi2 \. In the limit N → ∞, with e2 N fixed, the quantum fluctuations in A are of order 1/N. In this limit, the x oscillators behave as harmonic oscillators with a time dependent mass determined by the solution of a semiclassical equation for the expectation value A(t). This system can be described, when x(t)= 0, by a classical Hamiltonian for the variables G(t) = x2(t), G(t), Ac(t) = A(t), and Ac(t). The dynamics of this latter system turns out to be chaotic. We propose to study the nature of this large-N limit by considering both the exact quantum system as well as by studying an expansion in powers of 1/N for the equations of motion using the closed time path formalism of quantum dynamics.

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