2015
DOI: 10.1007/978-3-319-21353-8_10
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Algebraic Constructive Quantum Field Theory: Integrable Models and Deformation Techniques

Abstract: Several related operator-algebraic constructions for quantum field theory models on Minkowski spacetime are reviewed. The common theme of these constructions is that of a Borchers triple, capturing the structure of observables localized in a Rindler wedge. After reviewing the abstract setting, we discuss in this framework i) the construction of free field theories from standard pairs, ii) the inverse scattering construction of integrable QFT models on two-dimensional Minkowski space, and iii) the warped convol… Show more

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Cited by 33 publications
(28 citation statements)
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References 135 publications
(204 reference statements)
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“…An illustration of the power of this relatively new concept is the proof of existence of a class of two-dimensional models starting from the observations that certain algebraic structures in integrable d = 1 + 1 models can be used to construct modular localized wedge algebras [14]. In the work of Lechner and others this led to existence proofs for integrable models with nontrivial short distance behavior together with a wealth of new concepts (see the recent reviews [15,16] and the references therein).…”
Section: Wigner's Infinite Spin Representation and String-localizationmentioning
confidence: 99%
“…An illustration of the power of this relatively new concept is the proof of existence of a class of two-dimensional models starting from the observations that certain algebraic structures in integrable d = 1 + 1 models can be used to construct modular localized wedge algebras [14]. In the work of Lechner and others this led to existence proofs for integrable models with nontrivial short distance behavior together with a wealth of new concepts (see the recent reviews [15,16] and the references therein).…”
Section: Wigner's Infinite Spin Representation and String-localizationmentioning
confidence: 99%
“…The idea that the avoidance of singular pl or sl fields may be important for existence proofs of models of QFT is corroborated by the "top-down" construction of certain two-dimensional integrable models in which one starts with their known S-matrix which contains information as regards the algebraic structure of the wedge-localized algebras. By showing the existence of nontrivial intersections corresponding to compact localized algebras one arrives at the construction of a system of local algebras which fulfills all the properties of an algebraic QFT [12]. The question of whether it contains generating pl or sl fields remains open.…”
Section: Iim( F G) = [A( F ) A(g)] F G Real Test Functions (24)mentioning
confidence: 99%
“…In contrast to perturbation theory based on fields, these "top-down" constructions do not (yet?) arrive at generating fields for these algebras [12].…”
Section: Introductory Remarks On Origin and Scope Of String Localizationmentioning
confidence: 99%
“…The Zamolodchikov-Faddeev algebras [ZZ79,SF78] are a class of quadratic exchange algebras of "creation" and "annihilation" operators which generalize the familiar CCR and CAR algebras [BR79] and are closely related to Wick algebras that allow normal ordering [JSW95]. These algebras and their Hilbert space representations are of central importance in integrable quantum field theory (see, for example, [Smi92,AAR01,Lec15]) as well as in other fields such as q-deformations [MN08,SBGD04] or anyonic statistics.…”
Section: Introductionmentioning
confidence: 99%