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Light-ray wave functions and integrability

Alexandre Homrich, David Simmons–Duffin, Pedro Vieira

2024Journal of High Energy Physics11 citationsDOIOpen Access PDF

Abstract

A bstract Using integrability, we construct (to leading order in perturbation theory) the explicit form of twist-three light-ray operators in planar $$ \mathcal{N} $$ <mml:math xmlns:mml="http://www.w3.org/1998/Math/MathML"> <mml:mi>N</mml:mi> </mml:math> = 4 SYM. This construction allows us to directly compute analytically continued CFT data at complex spin. We derive analytically the “magic” decoupling zeroes previously observed numerically. Using the Baxter equation, we also show that certain Regge trajectories merge together into a single unifying Riemann surface. Perhaps more surprisingly, we find that this unification of Regge trajectories is not unique. If we organize twist-three operators differently into what we call “cousin trajectories” we find infinitely more possible continuations. We speculate about which of these remarkable features of twist-three operators might generalize to other operators, other regimes and other theories.

Topics & Concepts

PhysicsTwistMathematical physicsDecoupling (probability)Riemann surfacePlanarMerge (version control)Perturbation theory (quantum mechanics)UnificationTheoretical physicsPure mathematicsQuantum mechanicsGeometryMathematicsProgramming languageEngineeringControl engineeringComputer scienceInformation retrievalComputer graphics (images)Black Holes and Theoretical PhysicsAdvanced Mathematical Physics ProblemsNonlinear Waves and Solitons
Light-ray wave functions and integrability | Litcius