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The O(N) S-matrix monolith

Lucía Córdova, Yifei He, Martin Kruczenski, Pedro Vieira

2020Journal of High Energy Physics45 citationsDOIOpen Access PDF

Abstract

A bstract We consider the scattering matrices of massive quantum field theories with no bound states and a global O( N ) symmetry in two spacetime dimensions. In particular we explore the space of two-to-two S-matrices of particles of mass m transforming in the vector representation as restricted by the general conditions of unitarity, crossing, analyticity and O( N ) symmetry. We found a rich structure in that space by using convex maximization and in particular its convex dual minimization problem. At the boundary of the allowed space special geometric points such as vertices were found to correspond to integrable models. The dual convex minimization problem provides a novel and useful approach to the problem allowing, for example, to prove that generically the S-matrices so obtained saturate unitarity and, in some cases, that they are at vertices of the allowed space.

Topics & Concepts

PhysicsUnitaritySpacetimeMinificationSpace (punctuation)Quantum field theoryRegular polygonVector spaceIntegrable systemField (mathematics)Mathematical physicsSymmetry (geometry)Boundary (topology)ScatteringCrossingMaximizationDuality (order theory)Dual representationRepresentation (politics)Boundary value problemIntersection (aeronautics)CombinatoricsPure mathematicsMonolithDual spaceSpace timeTheoretical physicsVector fieldQuantum mechanicsHomogeneous spaceKilling vector fieldQuantumConvex setS-matrixField theory (psychology)Convex hullQuantum gravityAlgebraic structures and combinatorial modelsBlack Holes and Theoretical PhysicsQuantum many-body systems
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