6533b7d1fe1ef96bd125ce55

RESEARCH PRODUCT

A new formulation of the loop-tree duality at higher loops

Robert RunkelZoltán SzőrStefan WeinzierlJuan Pablo Vesga

subject

Discrete mathematicsHigh Energy Physics - TheoryLoop (graph theory)Recurrence relationDuality (mathematics)PropagatorFOS: Physical sciencesObject (computer science)Tree (graph theory)Massless particleHigh Energy Physics - PhenomenologyAmplitudeHigh Energy Physics - Phenomenology (hep-ph)High Energy Physics - Theory (hep-th)Mathematics

description

We present a new formulation of the loop-tree duality theorem for higher loop diagrams valid both for massless and massive cases. $l$-loop integrals are expressed as weighted sum of trees obtained from cutting $l$ internal propagators of the loop graph. In addition, the uncut propagators gain a modified $i \delta$-prescription, named dual-propagators. In this new framework one can go beyond graphs and calculate the integrand of loop amplitudes as a weighted sum of tree graphs, which form a tree-like object. These objects can be computed efficiently via recurrence relations.

yearjournalcountryeditionlanguage
2019-12-19
http://arxiv.org/abs/1911.09610