Actions for an Hierarchy of Attractive Nonlinear Oscillators Including the Quartic Oscillator in 1+1 Dimensions
Abstract
In this paper, we present an explicit form in terms of end-point data for the classical action S2n evaluated on extremals satisfying the Hamilton-Jacobi equation for each member of a hierarchy of classical non-relativistic oscillators characterized by even power potentials (i.e., attractive potentials V2n(y2n)=12nk2ny2n2n(t)|n≥1). The nonlinear quartic oscillator corresponds to n=2 while the harmonic oscillator corresponds to n=1.
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