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Types of quantum field thories
In analogy to how D=3 TQFTs are induced from quantum groups/Hopf algebras/ and generally bialgebras (hence 3-modules, the higher space of quantum states assigned to the point which by the cobordism theorem defines the theory) one may build D=4 TQFTs from higher analogs of these, namely models of 4-modules given by algebraic structures such as trialgebras and Hopf categories.
Original references:
Louis Crane, Louis Kauffman, David Yetter, State-Sum invariants of 4-manifolds I, Journal of Knot Theory and Its Ramifications Vol. 06, No. 02, pp. 177-234 (1997) (arXiv:hep-th/9409167, pdf, doi:10.1142/S0218216597000145)
Louis Crane, Igor Frenkel, Four dimensional topological quantum field theory, Hopf categories, and the canonical bases, J. Math. Phys. 35 (1994) 5136-5154, (arXiv:hep-th/9405183)
See also
Construction via factorization homology from braided tensor categories (with relation to double affine Hecke algebras) is discussed in
From fully dualizable braided tensor categories, via the cobordism hypothesis:
As descriptions of topological insulators/topological phases of matter:
Kevin Walker, Zhenghan Wang, (3+1)-TQFTs and Topological Insulators, Frontiers of Physics volume 7, pages 150–159 (2012) (arXiv:1104.2632, doi:10.1007/s11467-011-0194-z)
(see Walker-Wang model)
Clement Delcamp, Excitation basis for (3+1)d topological phases, Journal of High Energy Physics 2017 (2017) 128 (arXiv:1709.04924 doi:10.1007/JHEP12(2017)128)
Many more references should eventually go here…
Last revised on July 17, 2024 at 20:32:04. See the history of this page for a list of all contributions to it.