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1. We define a three-dimensional quantum theory of gravity as the holographic dual of the Liouville conformal field theory.^[1]
2. In Liouville theory, momentum is not conserved.^[2]
3. These quantum symmetries of Liouville theory are however not manifest in the Lagrangian formulation, in particular the exponential potential is not invariant under the duality.^[2]
4. The spectrum of Liouville theory does not include a vacuum state.^[2]
5. Liouville theory can be used to identify patterns in the endless landscape of all possible random, jagged surfaces.^[3]
6. Liouville theory packages all those surfaces together into one object.^[3]
7. In part I, we review the bosonic Liouville theory.^[4]
8. In part II, we review the supersymmetric extension of the Liouville theory.^[4]
9. We first discuss the bulk structure constants and the branes as in the bosonic Liouville theory, and then we present the matrix dual descriptions with some applications.^[4]
10. This review also includes some original material such as the derivation of the conjectured dual action for the Liouville theory from other known dualities.^[4]
11. It is verified that in the classical limit this expression reduces to what the classical Liouville theory predicts.^[5]
12. Abstract: An analytic expression is proposed for the three-point function of the exponential fields in the Liouville field theory on a sphere.^[6]
13. In the classical limit it coincides with what the classical Liouville theory predicts.^[6]
14. Using quantized self dual fields, the authors present an explicit operator solution to the Liouville theory, and discuss the results.^[7]
15. The Liouville theory presents many problems; it is known to be integrable, and the authors aim at an explicit solution.^[7]
16. Teschner J., Liouville theory revisited, Classical Quantum Gravity 18 (2001), 153-222, hep-th/0104158.^[8]
17. Liouville conformal field theory (LCFT) was introduced by Polyakov in 1981 as an essential ingredient in his path integral construction of string theory.^[9]
18. Since then Liouville theory has appeared in a wide variety of contexts ranging from random conformal geometry to 4d Yang-Mills theory with supersymmetry.^[9]
19. A rigorous probabilistic construction of Liouville conformal field theory (LCFT) on the Riemann sphere was recently given by David-Kupiainen and the last two authors.^[10]
20. In this paper, we focus on the connection between LCFT and the classical Liouville field theory via the semiclassical approach.^[10]
21. The integrable structure of Liouville theory Jorg Teschner DESY Hamburg Joint with A. Bytsko Typeset by FoilTEX What is Liouville theory?^[11]
22. Typeset by FoilTEX 1 What is Liouville theory?^[11]
23. Typeset by FoilTEX 2 What is quantum Liouville theory?^[11]
24. Typeset by FoilTEX 5 The integrable structure of Liouville theory 0 Why are we interested in the integrable structure of Liouville theory ?^[11]
25. CORE Provided by CERN Document Server Metadata, citation and similar papers at core.ac.uk Liouville Field Theory on a Pseudosphere RUNHETC-2001-02 LPM-01-01 January, 2001 A.Zamolodchikov and Al.^[12]

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• ID : Q6556124

Spacy 패턴 목록

• [{'LOWER': 'liouville'}, {'LOWER': 'field'}, {'LEMMA': 'theory'}]
• [{'LOWER': 'liouville'}, {'LEMMA': 'theory'}]
• [{'LOWER': 'liouville'}, {'LOWER': 'conformal'}, {'LOWER': 'field'}, {'LEMMA': 'theory'}]