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Geometric soft theorems

Clifford Cheung, Andreas Helset, Julio Parra-Martinez

2022Journal of High Energy Physics57 citationsDOIOpen Access PDF

Abstract

A bstract We derive a universal soft theorem for every scattering amplitude with at least one massless particle in an arbitrary theory of scalars. Our results follow from the geometry of field space and are valid for any choice of mass spectrum, potential terms, and higher-derivative interactions. For a vanishing potential, the soft limit of every amplitude is equal to the field-space covariant derivative of an amplitude with one fewer particle. Furthermore, the Adler zero and the dilaton soft theorem are special cases of our results. We also discuss more exotic scenarios in which the soft limit is non-trivial but still universal. Last but not least, we derive new theorems for multiple-soft limits which directly probe the field-space curvature, as well as on-shell recursion relations applicable to two-derivative scalar field theories exhibiting no symmetries whatsoever.

Topics & Concepts

PhysicsCovariant transformationMassless particleScattering amplitudeDilatonMinkowski spaceLimit (mathematics)Mathematical physicsAmplitudeScalar (mathematics)Homogeneous spaceScalar fieldGauge theoryScalar field theoryRecursion (computer science)Theoretical physicsField (mathematics)Field theory (psychology)Zero (linguistics)Covariant derivativeSpace (punctuation)Space timeDuality (order theory)TrivialityQuantum electrodynamicsQuantum field theoryLoop (graph theory)PropagatorFree fieldBlack Holes and Theoretical PhysicsCosmology and Gravitation TheoriesNoncommutative and Quantum Gravity Theories
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