arXiv:1308.6676 Abstract | arXiv Analytics

arXiv:1308.6676 [hep-ph]Abstract References Reviews Resources

Critical points and number of master integrals

Published 2013-08-30, updated 2013-09-06Version 2

We consider the question about the number of master integrals for a multiloop Feynman diagram. We show that, for a given set of denominators, this number is totally determined by the critical points of the polynomials entering either of the two representations: the parametric representation and the Baikov representation. In particular, for the parametric representation the corresponding polynomial is just the sum of Symanzik polynomials. The relevant topological invariant is the sum of the Milnor numbers of the proper critical points. We present a Mathematica package Mint to automatize the counting of the master integrals.

Comments: 16 pages, minor changes

DOI: 10.1007/JHEP11(2013)165

Categories: hep-ph, hep-th

Keywords: master integrals, parametric representation, multiloop feynman diagram, mathematica package mint, proper critical points

Tags: journal article

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