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searching for Jones polynomial 18 found (95 total)

alternate case: jones polynomial

Mikhail Khovanov (247 words) [view diff] exact match in snippet view article find links to article

categorification of the Jones polynomial" (Page 337). Khovanov, Mikhail (2000), "A categorification of the Jones polynomial", Duke Mathematical Journal

S2CID 115176676. Khovanov, Mikhail (2000). "A categorification of the Jones polynomial". Duke Mathematical Journal. 101 (3): 359–426. arXiv:math/9908171.

S2CID 13889163. Khovanov, Mikhail (2000). "A categorification of the Jones polynomial". Duke Mathematical Journal. 1011 (3): 359–426. arXiv:math/9908171

S2CID 43230714 Witten, Edward (1989). "Quantum Field Theory and the Jones Polynomial" (PDF). Communications in Mathematical Physics. 121 (3): 351–399. Bibcode:1989CMaPh

representation theory and can be used to construct knot invariants such as the Jones polynomial. Loop quantum gravity (LQG) thus became related to topological quantum

doi:10.1016/0040-9383(83)90045-9. Birman, Joan S. (1985). "On the Jones polynomial of closed 3-braids". Inventiones Mathematicae. 81 (2): 287–294. Bibcode:1985InMat

Landau (2009). "A Polynomial Quantum Algorithm for Approximating the Jones Polynomial". Algorithmica. 55 (3): 395–421. arXiv:quant-ph/0511096. doi:10

arXiv:hep-th/0011260 Witten, Edward (1989). "Quantum Field Theory and the Jones Polynomial". Communications in Mathematical Physics. 121 (3): 351–399. Bibcode:1989CMaPh

S2CID 123376541. Witten, Edward (1989). "Quantum field theory and the Jones polynomial". Communications in Mathematical Physics. 121 (3): 351–399. Bibcode:1989CMaPh

S2CID 119166976. Witten, Edward (1989). "Quantum Field Theory and the Jones Polynomial". Communications in Mathematical Physics. 121 (3): 351–399. Bibcode:1989CMaPh

ISBN 978-981-02-0343-6. Kauffman, Louis H. (1987). "State Models and the Jones Polynomial". Topology. 26 (3): 395–407. doi:10.1016/0040-9383(87)90009-7. MR 0899057

1016/S0167-2789(01)00304-9. Liu, Xin; Ricca, Renzo L. (2012). "The Jones polynomial for fluid knots from helicity". J. Phys. A. 45 (20): 205501. Bibcode:2012JPhA

S2CID 206329868. Witten, E. (1989). "Quantum field theory and the Jones polynomial". Comm. Math. Phys. 121 (3): 351–399. Bibcode:1989CMaPh.121..351W.

ISSN 0550-3213. Witten, E. (1989). "Quantum Field Theory and the Jones Polynomial". Comm. Math. Phys. 121 (3): 351. Bibcode:1989CMaPh.121..351W. doi:10

Landau (2009). "A Polynomial Quantum Algorithm for Approximating the Jones Polynomial". Algorithmica. 55 (3): 395–421. arXiv:quant-ph/0511096. doi:10

whose research topics have included hyperbolic Dehn surgery and the Jones polynomial Donald Sarason (January 26, 1933 – April 8, 2017), mathematician who

(2006-04-10), A Polynomial Quantum Algorithm for Approximating the Jones Polynomial, arXiv:quant-ph/0511096 Cui, Shawn X.; Hong, Seung-Moon; Wang, Zhenghan

ISSN 1432-1297. Witten, Edward (1989-09-01). "Quantum field theory and the Jones polynomial". Communications in Mathematical Physics. 121 (3): 351–399. Bibcode:1989CMaPh