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The uncertainty principle and classical amplitudes

Andrea Cristofoli, Riccardo Gonzo, Nathan Moynihan, Donal O’Connell, Alasdair Ross, Matteo Sergola, Chris D. White

2024Journal of High Energy Physics40 citationsDOIOpen Access PDF

Abstract

A bstract We study the variance in the measurement of observables during scattering events, as computed using amplitudes. The classical regime, characterised by negligible uncertainty, emerges as a consequence of an infinite set of relationships among multileg, multiloop amplitudes in a momentum-transfer expansion. We discuss two non-trivial examples in detail: the six-point tree and the five-point one-loop amplitudes in scalar QED. We interpret these relationships in terms of a coherent exponentiation of radiative effects in the classical limit which generalises the eikonal formula, and show how to recover the impulse, including radiation reaction, from this generalised eikonal. Finally, we incorporate the physics of spin into our framework.

Topics & Concepts

PhysicsObservableAmplitudeEikonal equationScattering amplitudeScalar (mathematics)ExponentiationRadiative transferQuantum electrodynamicsMathematical physicsImpulse (physics)Statistical physicsQuantum mechanicsClassical mechanicsTheoretical physicsMathematical analysisMathematicsGeometryBlack Holes and Theoretical PhysicsParticle physics theoretical and experimental studiesPulsars and Gravitational Waves Research