Abstract
We introduce a new diagrammatic approach to perturbative quantum field theory, which we call flow-oriented perturbation theory (FOPT). Within it, Feynman graphs are replaced by strongly connected directed graphs (digraphs). FOPT is a coordinate space analogue of time-ordered perturbation theory and loop-tree duality, but it has the advantage of having combinatorial and canonical Feynman rules, combined with a simplified iε dependence of the resulting integrals. Moreover, we introduce a novel digraph-based representation for the S-matrix. The associated integrals involve the Fourier transform of the flow polytope. Due to this polytope’s properties, our S-matrix representation exhibits manifest infrared singularity factorization on a per-diagram level. Our findings reveal an interesting interplay between spurious singularities and Fourier transforms of polytopes.
Original language | English |
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Article number | 172 |
Number of pages | 54 |
Journal | Journal of High Energy Physics |
Volume | 2023 |
Issue number | 1 |
DOIs | |
Publication status | Published - Feb 2023 |
Keywords
- Field Theories in Lower Dimensions
- Higher-Order Perturbative Calculations
- Renormalization and Regularization
- Scattering Amplitudes