The purpose of this talk is to review recent progress in Landau analysis, which aims to predict the singularity structure of Feynman integrals before explicitly evaluating them. In the first part, he will discuss the advantages and disadvantages of formulating this problem in both Schwinger parameter space and momentum (Baikov) space. In the second part, Mathieu Giroux will explain how the latter approach extends the powerful unitary-based method of arXiv:2406.05241 beyond two-particle cut-reducible graphs. To demonstrate its efficiency, he will present new results for multi-loop and multi-scale Feynman integrals, derived using an automatized Mathematica implementation in preparation.
The UNIVERSE+ Online Seminar Series is designed to foster dialogue and collaboration among project partners and those interested in positive geometry.
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