Fermionic integrable models and graded Borchers triples

Bostelmann, Henning; Cadamuro, Daniela

doi:10.1007/s11005-024-01865-1

Lett Math Phys

2024

DOI: 10.1007/s11005-024-01865-1

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Fermionic integrable models and graded Borchers triples

Henning Bostelmann,

Daniela Cadamuro

Abstract: We provide an operator-algebraic construction of integrable models of quantum field theory on 1+1-dimensional Minkowski space with fermionic scattering states. These are obtained by a grading of the wedge-local fields or, alternatively, of the underlying Borchers triple defining the theory. This leads to a net of graded-local field algebras, of which the even part can be considered observable, although it is lacking Haag duality. Importantly, the nuclearity condition implying nontriviality of the local field a… Show more

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KMS States on $${\mathbb {Z}}_2$$-Crossed Products and Twisted KMS Functionals

Correa da Silva,

Große,

Lechner

2024

Ann. Henri Poincaré

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KMS states on $${\mathbb {Z}}_2$$ Z 2 -crossed products of unital $$C^*$$ C ∗ -algebras $${\mathcal {A}}$$ A are characterized in terms of KMS states and twisted KMS functionals of $${\mathcal {A}}$$ A . These functionals are shown to describe the extensions of KMS states $$\omega $$ ω on $${\mathcal {A}}$$ A to the crossed product $${\mathcal {A}} \rtimes {\mathbb {Z}}_2$$ A ⋊ Z 2 and can also be characterized by the twisted center of the von Neumann algebra generated by the GNS representation corresponding to $$\omega $$ ω . As a particular class of examples, KMS states on $${\mathbb {Z}}_2$$ Z 2 -crossed products of CAR algebras with dynamics and grading given by Bogoliubov automorphisms are analyzed in detail. In this case, one or two extremal KMS states are found depending on a Gibbs-type condition involving the odd part of the absolute value of the Hamiltonian. As an application in mathematical physics, the extended field algebra of the Ising QFT is shown to be a $${\mathbb {Z}}_2$$ Z 2 -crossed product of a CAR algebra which has a unique KMS state.

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KMS States on $${\mathbb {Z}}_2$$-Crossed Products and Twisted KMS Functionals

Correa da Silva,

Große,

Lechner

2024

Ann. Henri Poincaré

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show abstract

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Fermionic integrable models and graded Borchers triples

Cited by 1 publication

References 40 publications

KMS States on $${\mathbb {Z}}_2$$-Crossed Products and Twisted KMS Functionals

KMS States on $${\mathbb {Z}}_2$$-Crossed Products and Twisted KMS Functionals

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