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Path integral for the quartic oscillator: An accurate analytic formula for the partition function

Quantum Physics 2024-09-23 v4 Statistical Mechanics Atomic Physics Chemical Physics

Abstract

In this work an approximate analytic expression for the quantum partition function of the quartic oscillator described by the potential V(x)=12ω2x2+gx4V(x) = \frac{1}{2} \omega^2 x^2 + g x^4 is presented. Using a path integral formalism, the exact partition function is approximated by the partition function of a harmonic oscillator with an effective frequency depending both on the temperature and coupling constant gg. By invoking a Principle of Minimal Sensitivity (PMS) of the path integral to the effective frequency, we derive a mathematically well-defined analytic formula for the partition function. Quite remarkably, the formula reproduces qualitatively and quantitatively the key features of the exact partition function. The free energy is accurate to a few percent over the entire range of temperatures and coupling strengths gg. Both the harmonic (g0g\rightarrow 0) and classical (high-temperature) limits are exactly recovered. The divergence of the power series of the ground-state energy at weak coupling, characterized by a factorial growth of the perturbational energies, is reproduced as well as the functional form of the strong-coupling expansion along with accurate coefficients. Explicit accurate expressions for the ground- and first-excited state energies, E0(g)E_0(g) and E1(g)E_1(g) are also presented.

Keywords

Cite

@article{arxiv.2312.09859,
  title  = {Path integral for the quartic oscillator: An accurate analytic formula for the partition function},
  author = {Michel Caffarel},
  journal= {arXiv preprint arXiv:2312.09859},
  year   = {2024}
}

Comments

15 pages, 4 figures. Minor revisions

R2 v1 2026-06-28T13:52:28.664Z