Litcius/Paper detail

Loop-tree duality from vertices and edges

William J. Torres Bobadilla

2021Journal of High Energy Physics31 citationsDOIOpen Access PDF

Abstract

A bstract The causal representation of multi-loop scattering amplitudes, obtained from the application of the loop-tree duality formalism, comprehensively elucidates, at integrand level, the behaviour of only physical singularities. This representation is found to manifest compact expressions for multi-loop topologies that have the same number of vertices . Interestingly, integrands considered in former studies, with up-to six vertices and L internal lines, display the same structure of up-to four-loop ones. The former is an insight that there should be a correspondence between vertices and the collection of internal lines, edges , that characterise a multi-loop topology. By virtue of this relation, in this paper, we embrace an approach to properly classify multi-loop topologies according to vertices and edges. Differently from former studies, we consider the most general topologies, by connecting vertices and edges in all possible ways. Likewise, we provide a procedure to generate causal representation of multi-loop topologies by considering the structure of causal propagators. Explicit causal representations of loop topologies with up-to nine vertices are provided.

Topics & Concepts

PropagatorLoop (graph theory)Network topologyMathematicsGravitational singularityTopology (electrical circuits)Duality (order theory)Formalism (music)Representation (politics)Comparison of topologiesCombinatoricsDiscrete mathematicsComputer scienceMathematical analysisGeneral topologyTopological spaceExtension topologyPolitical scienceLawArtOperating systemMusicalMathematical physicsVisual artsPoliticsParticle physics theoretical and experimental studiesParticle Accelerators and Free-Electron LasersBlack Holes and Theoretical Physics
Loop-tree duality from vertices and edges | Litcius