Differential equations and dispersion relations for Feynman amplitudes.
  The two-loop massive sunrise and the kite integral

Ablinger; Ablinger; Adams; Adams; Adams; Adams; Argeri; Bauberger; Bauberger; Bloch; Bloch; Borowka; Broadhurst; Caffo; Caron-Huot; Cutkosky; Gehrmann; Gehrmann; Gehrmann; Goncharov; Goncharov; Henn; Henn; Kotikov; Laporta; Panzer; Paulos; Remiddi; Remiddi; Remiddi; Remiddi; Sabry; Studerus; Tancredi; Tarasov; Veltman; Vermaseren; von Manteuffel

research

Differential equations and dispersion relations for Feynman amplitudes. The two-loop massive sunrise and the kite integral

Authors: Ablinger
Ablinger
Adams
Adams
Adams
Adams
Argeri
Bauberger
Bauberger
Bloch
Bloch
Borowka
Broadhurst
Caffo
Caron-Huot
Cutkosky
Gehrmann
Gehrmann
Gehrmann
Goncharov
Goncharov
Henn
Henn
Kotikov
Laporta
Panzer
Paulos
Remiddi
Remiddi
Remiddi
Remiddi
Sabry
Studerus
Tancredi
Tarasov
Veltman
Vermaseren
von Manteuffel
Publication date: 28 June 2016
Publisher: 'Elsevier BV'
Doi

Abstract

It is shown that the study of the imaginary part and of the corresponding dispersion relations of Feynman graph amplitudes within the differential equations method can provide a powerful tool for the solution of the equations, especially in the massive case. The main features of the approach are illustrated by discussing the simple cases of the 1-loop self-mass and of a particular vertex amplitude, and then used for the evaluation of the two-loop massive sunrise and the QED kite graph (the problem studied by Sabry in 1962), up to first order in the (d-4) expansion.Comment: 36 pages, v3 fixed a typo in Eq.(5.5