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arxiv: 1806.01686 · v1 · pith:DZLHNDZDnew · submitted 2018-06-05 · 🧮 math-ph · math.MP

Direct construction of pointlike observables in the Ising model

classification 🧮 math-ph math.MP
keywords localpointlikeconstructionfieldsisingmodeloperatorsalgebras
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The construction of pointlike fields in quantum integrable models is usually approached by constructing their n-point functions. However, convergence questions of the resulting infinite series remain unresolved even in the simplest case of the massive Ising model. On the other hand, the C*-algebraic approach to the construction considers semi-local bounded operators, but yields local operators only in a very abstract way. We use a novel approach to investigate the structure of these local observables, in the form of smeared pointlike quantum fields. Instead of considering their n-point functions and verifying the Wightman axioms, we establish them as closed operators affiliated with the local C*-algebras. We explicitly construct all pointlike fields of the Ising model, verify the Reeh-Schlieder property and show that they generate the local algebras by dualization.

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