Yuya Sasai scite author profile

Braided quantum field theories, proposed by Oeckl, can provide a framework for quantum field theories that possess Hopf algebra symmetries. In quantum field theories, symmetries lead to non-perturbative relations among correlation functions. We study Hopf algebra symmetries and such relations in the context of braided quantum field theories. We give the four algebraic conditions among Hopf algebra symmetries and braided quantum field theories that are required for the relations to hold. As concrete examples, we apply our analysis to the Poincaré symmetries of two examples of noncommutative field theories. One is the effective quantum field theory of three-dimensional quantum gravity coupled to spinless particles formulated by Freidel and Livine, and the other is noncommutative field theory on the Moyal plane. We also comment on quantum field theory in κ-Minkowski Since in the Ponzano-Regge model, the definition of the weight of the partition function is e iS , despite Euclidean theory, the sign of the mass term is not the usual one.

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Exact results in quiver quantum mechanics and BPS bound state counting

Ohta

Sasai

2014

J. High Energ. Phys.

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We exactly evaluate the partition function (index) of N = 4 supersymmetric quiver quantum mechanics in the Higgs phase by using the localization techniques. We show that the path integral is localized at the fixed points, which are obtained by solving the BRST equations, and D-term and F-term conditions. We turn on background gauge fields of R-symmetries for the chiral multiplets corresponding to the arrows between quiver nodes, but the partition function does not depend on these R-charges. We give explicit examples of the quiver theory including a non-coprime dimension vector. The partition functions completely agree with the mathematical formulae of the Poincaré polynomials (χ y -genus) and the wall crossing for the quiver moduli spaces. We also discuss exact computation of the expectation values of supersymmetric (Q-closed) Wilson loops in the quiver theory.

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One-loop unitarity of scalar field theories on Poincaré invariant commutative nonassociative spacetimes

Sasai

Sasakura

2006

J. High Energy Phys.

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We study scalar field theories on Poincaré invariant commutative nonassociative spacetimes. We compute the one-loop self-energy diagrams in the ordinary path integral quantization scheme with Feynman's prescription, and find that the Cutkosky rule is satisfied. This property is in contrast with that of noncommutative field theory, since it is known that noncommutative field theory with space/time noncommutativity violates unitarity in the above standard scheme, and the quantization procedure will necessarily become complicated to obtain a sensible Poincaré invariant noncommutative field theory. We point out a peculiar feature of the non-locality in our nonassociative field theories, which may explain the property of the unitarity distinct from noncommutative field theories. Thus commutative nonassociative field theories seem to contain physically interesting field theories on deformed spacetimes. *

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Shear viscosity of a highly excited string and the black hole membrane paradigm

Sasai

2011

Phys. Rev. D

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Yuya Sasai

Braided Quantum Field Theories and Their Symmetries

Exact results in quiver quantum mechanics and BPS bound state counting

One-loop unitarity of scalar field theories on Poincaré invariant commutative nonassociative spacetimes

Shear viscosity of a highly excited string and the black hole membrane paradigm

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