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Quantum vertex algebras

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abstract

The purpose of this paper is to make the theory of vertex algebras trivial. We do this by setting up some categorical machinery so that vertex algebras are just ``singular commutative rings'' in a certain category. This makes it easy to construct many examples of vertex algebras, in particular by using an analogue of the construction of a twisted group ring from a bicharacter of a group. We also define quantum vertex algebras as singular braided rings in the same category and construct some examples of them. The constructions work just as well for higher dimensional analogues of vertex algebras.

fields

hep-th 1

years

2026 1

verdicts

UNVERDICTED 1

representative citing papers

$BMS_3$-like algebras via the $Z_N$-graded $u(1)^2$ Kac-Moody algebra

hep-th · 2026-06-28 · unverdicted · novelty 6.0

Compactification of the non-compact algebraic varieties of Z_N-graded Sugawara constructions on u(1)^2 Kac-Moody yields BMS3-like algebras Vir ⋊ F with F nilpotent of depth r < N for N>2, with depth tied to singularity order.

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  • $BMS_3$-like algebras via the $Z_N$-graded $u(1)^2$ Kac-Moody algebra hep-th · 2026-06-28 · unverdicted · none · ref 30 · internal anchor

    Compactification of the non-compact algebraic varieties of Z_N-graded Sugawara constructions on u(1)^2 Kac-Moody yields BMS3-like algebras Vir ⋊ F with F nilpotent of depth r < N for N>2, with depth tied to singularity order.