中文

Evaluation of two-loop self-energy basis integrals using differential equations

高能物理 - 唯象学 2014-11-17 v1

摘要

I study the Feynman integrals needed to compute two-loop self-energy functions for general masses and external momenta. A convenient basis for these functions consists of the four integrals obtained at the end of Tarasov's recurrence relation algorithm. The basis functions are modified here to include one-loop and two-loop counterterms to render them finite; this simplifies the presentation of results in practical applications. I find the derivatives of these basis functions with respect to all squared-mass arguments, the renormalization scale, and the external momentum invariant, and express the results algebraically in terms of the basis. This allows all necessary two-loop self-energy integrals to be efficiently computed numerically using the differential equation in the external momentum invariant. I also use the differential equations method to derive analytic forms for various special cases, including a four-propagator integral with three distinct non-zero masses.

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引用

@article{arxiv.hep-ph/0307101,
  title  = {Evaluation of two-loop self-energy basis integrals using differential equations},
  author = {Stephen P. Martin},
  journal= {arXiv preprint arXiv:hep-ph/0307101},
  year   = {2014}
}

备注

17 pages, LaTeX, uses revtex4 and axodraw.sty