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A C*-algebraic Approach to Interacting Quantum Field Theories

Detlev Buchholz, Klaus Fredenhagen

2020Communications in Mathematical Physics29 citationsDOIOpen Access PDF

Abstract

Abstract A novel C*-algebraic framework is presented for relativistic quantum field theories, fixed by a Lagrangean. It combines the postulates of local quantum physics, encoded in the Haag–Kastler axioms, with insights gained in the perturbative approach to quantum field theory. Key ingredients are an appropriate version of Bogolubov’s relative S -operators and a reformulation of the Schwinger–Dyson equations. These are used to define for any classical relativistic Lagrangean of a scalar field a non-trivial local net of C*-algebras, encoding the resulting interactions at the quantum level. The construction works in any number of space-time dimensions. It reduces the longstanding existence problem of interacting quantum field theories in physical spacetime to the question of whether the C*-algebras so constructed admit suitable states, such as stable ground and equilibrium states. The method is illustrated on the example of a non-interacting field and it is shown how to pass from it within the algebra to interacting theories by relying on a rigorous local version of the interaction picture.

Topics & Concepts

Quantum field theoryPhysicsTheoretical physicsQuantumScalar fieldField (mathematics)Open quantum systemSpacetimeQuantum gravityQuantum processQuantum algorithmGroup field theoryQuantum operationQuantum dynamicsQuantum mechanicsQuantization (signal processing)Classical mechanicsRelationship between string theory and quantum field theoryQuantum systemScalar (mathematics)Quantum informationQuantum probabilityQuantum field theory in curved spacetimeThermal quantum field theoryQuantum dissipationScalar field theoryMathematicsS-matrixSpace (punctuation)Physical systemField theory (psychology)Algebra over a fieldAdvanced Operator Algebra ResearchSpectral Theory in Mathematical PhysicsQuantum Mechanics and Applications