Recent developments from the loop-tree duality

German Rodrigo; Felix Driencourt-Mangin; German F. R. Sborlini and; Roger J. Hernandez-Pinto

arXiv:1801.04465·hep-ph·January 16, 2018

Recent developments from the loop-tree duality

German Rodrigo, Felix Driencourt-Mangin, German F. R. Sborlini and, Roger J. Hernandez-Pinto

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TL;DR

This paper reviews recent advances in the loop-tree duality (LTD) method, highlighting its benefits for asymptotic expansions of loop integrands in four-dimensional unsubtraction techniques.

Contribution

It presents the latest developments in LTD and FDU methods, emphasizing their advantages in simplifying loop calculations.

Findings

01

LTD improves asymptotic expansion efficiency.

02

Recent developments enhance four-dimensional loop calculations.

03

LTD formalism offers computational advantages.

Abstract

In this talk, we review the most recent developments of the four-dimensional unsubstraction (FDU) and loop-tree duality (LTD) methods. In particular, we make emphasis on the advantages of the LTD formalism regarding asymptotic expansions of loop integrands.

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