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Generalized symmetries and Noether's theorem in QFT

Valentín Benedetti

2022VUBIR (Vrije Universiteit Brussel)42 citationsDOIOpen Access PDF

Abstract

We show that generalized symmetries cannot be charged under a continuous global symmetry having a Noether current. Further, only non-compact generalized symmetries can be charged under a continuous global symmetry. These results follow from a finer classification of twist operators, which naturally extends to finite group global symmetries. They unravel topological obstructions to the strong version of Noether’s theorem in QFT, even if under general conditions a global symmetry can be implemented locally by twist operators (weak version). We use these results to rederive Weinberg-Witten’s theorem within local QFT, generalizing it to massless particles in arbitrary dimensions and representations of the Lorentz group. Several examples with local twists but without Noether currents are described. We end up discussing the conditions for the strong version to hold, dynamical aspects of QFT’s with non-compact generalized symmetries, scale vs conformal invariance in QFT, connections with the Coleman-Mandula theorem and aspects of global symmetries in quantum gravity.

Topics & Concepts

Noether's theoremHomogeneous spaceMathematical physicsSymmetry (geometry)PhysicsMassless particleConformal symmetryTwistTheoretical physicsMathematicsPure mathematicsConformal mapMathematical analysisGeometryBlack Holes and Theoretical PhysicsNoncommutative and Quantum Gravity TheoriesAlgebraic structures and combinatorial models
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