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相关论文: General Formula for N-point One-loop Feynman Integ…

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Three-point vertex diagram plays a key role in the whole renormalization program of several QFT (quantum field theory) models such as QED, QCD, the Standard Model of eletroweak interactions and so forth. The exact analytic result for the…

高能物理 - 唯象学 · 物理学 2008-08-12 A. T. Suzuki , J. D. Bolzan , A. G. M. Schmidt

A method of functional reduction for the dimensionally regularized one-loop Feynman integrals with massive propagators is described in detail. The method is based on a repeated application of the functional relations proposed by the author.…

高能物理 - 唯象学 · 物理学 2022-07-13 O. V. Tarasov

Negative dimensional integration is a step further dimensional regularization ideas. In this approach, based on the principle of analytic continuation, Feynman integrals are polynomial ones and for this reason very simple to handle,…

高能物理 - 理论 · 物理学 2009-10-30 Alfredo T. Suzuki , Alexandre G. M. Schmidt

An efficient way to calculate one-loop counterterms within the Feynman diagrammatic approach and dimensional regularization is to expand the propagators in the integrands of the Feynman integrals around vanishing external momentum. In this…

高能物理 - 唯象学 · 物理学 2019-09-04 Christian F. Steinwachs

We show how to evaluate tensor one-loop integrals in momentum space avoiding the usual plague of Gram determinants. We do this by constructing combinations of $n$- and $(n-1)$-point scalar integrals that are finite in the limit of vanishing…

高能物理 - 唯象学 · 物理学 2008-11-26 J. M. Campbell , E. W. N. Glover , D. J. Miller

An algorithm for the reduction of one-loop n-point tensor integrals to basic integrals is proposed. We transform tensor integrals to scalar integrals with shifted dimension and reduce these by recurrence relations to integrals in generic…

高能物理 - 唯象学 · 物理学 2008-11-26 J. Fleischer , F. Jegerlehner , O. V. Tarasov

Feynman integrals in the physical light-cone gauge are harder to solve than their covariant counterparts. The difficulty is associated with the presence of unphysical singularities due to the inherent residual gauge freedom in the…

高能物理 - 理论 · 物理学 2014-11-18 A. T. Suzuki , A. G. M. Schmidt

A formalism for the numerical integration of one- and two-loop integrals is presented. It is based on subtraction terms which remove the soft, collinear and some of the ultraviolet divergences from the integrand. The numerical integral is…

高能物理 - 唯象学 · 物理学 2012-10-08 A. Freitas

Feynman diagrams are the best tool we have to study perturbative quantum field theory. For this very reason the development of any new technique which allows us to compute Feynman integrals is welcome. By the middle of the 80's, Halliday…

高能物理 - 理论 · 物理学 2007-05-23 Alfredo T. Suzuki , Alexandre G. M. Schmidt

In this sequel calculation of the one-loop Feynman integral pertaining to a massive box diagram contributing to the photon-photon scattering amplitude in quantum electrodynamics, we present the six solutions as yet unknown in the…

高能物理 - 理论 · 物理学 2007-05-23 Alfredo T. Suzuki , Alexandre G. M. Schmidt

A systematic study of the scalar one-loop two-, three-, and four-point Feynman integrals is performed. We consider all cases of mass assignment and external invariants and derive closed expressions in arbitrary space-time dimension in terms…

高能物理 - 唯象学 · 物理学 2016-04-14 Johannes Bluemlein , Khiem Hong Phan , Tord Riemann

In order to calculate cross sections with a large number of particles/jets in the final state at next-to-leading order, one has to reduce the occurring scalar and tensor one-loop integrals to a small set of known integrals. In massless…

高能物理 - 唯象学 · 物理学 2009-10-31 G. Heinrich , T. Binoth

In this paper, we study systematically scalar one-loop two-, three-, and four-point Feynman integrals with complex internal masses. Our analytic results presented in this report are valid for both real and complex internal masses. The…

高能物理 - 唯象学 · 物理学 2018-09-19 K. H. Phan , T. N. H. Pham

The soft and collinear singularities of general scalar and tensor one-loop N-point integrals are worked out explicitly. As a result a simple explicit formula is given that expresses the singular part in terms of 3-point integrals. Apart…

高能物理 - 唯象学 · 物理学 2010-04-05 Stefan Dittmaier

In this paper, we describe a numerical approach to evaluate Feynman loop integrals. In this approach the key technique is a combination of a numerical integration method and a numerical extrapolation method. Since the computation is carried…

高能物理 - 唯象学 · 物理学 2011-09-21 F. Yuasa , T. Ishikawa , Y. Kurihara , J. Fujimoto , Y. Shimizu , N. Hamaguchi , E. de Doncker , K. Kato

Recently a nice work about the understanding of one-loop integrals has been done in [1] using the tricks of the projective space language associated to their Feynman parametrization. We find this language is also very suitable to deal with…

高能物理 - 唯象学 · 物理学 2022-10-12 Bo Feng , Jianyu Gong , Tingfei Li

Based on the method in Refs.~{\tt [D.~Kreimer, Z.\ Phys.\ C {\bf 54} (1992) 667} and {\tt Int.\ J.\ Mod.\ Phys.\ A {\bf 8} (1993) 1797]}, we present analytic results for scalar one-loop four-point Feynman integrals with complex internal…

高能物理 - 唯象学 · 物理学 2019-12-06 K. H. Phan

A recently derived approach to the tensor reduction of 5-point one-loop Feynman integrals expresses the tensor coefficients by scalar 1-point to 4-point Feynman integrals completely algebraically. In this letter we derive extremely compact…

高能物理 - 唯象学 · 物理学 2011-07-20 J. Fleischer , T. Riemann

We present new methods for the evaluation of one-loop tensor integrals which have been used in the calculation of the complete electroweak one-loop corrections to e+ e- -> 4 fermions. The described methods for 3-point and 4-point integrals…

高能物理 - 唯象学 · 物理学 2008-11-26 A. Denner , S. Dittmaier

A framework to represent and compute two-loop $N$-point Feynman diagrams as double-integrals is discussed. The integrands are 'generalised one-loop type" multi-point functions multiplied by simple weighting factors. The final integrations…

高能物理 - 唯象学 · 物理学 2020-04-15 J. Ph. Guillet , E. Pilon , Y. Shimizu , M. S. Zidi