Sylvain Ribault scite author profile

We present a comprehensive analysis of branes in the Euclidean 2D black hole (cigar). In particular, exact boundary states and annulus amplitudes are provided for D0-branes which are localized at the tip of the cigar as well as for two families of extended D1 and D2-branes. Our results are based on closely related studies for the Euclidean AdS 3 model [1] and, as predicted by the conjectured duality between the 2D black hole and the sine-Liouville model, they share many features with branes in Liouville theory. New features arise here due to the presence of closed string modes which are localized near the tip of the cigar. The paper concludes with some remarks on possible applications.

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H₃⁺-WZNW correlators from Liouville theory

Ribault¹,

Teschner²

2005

J. High Energy Phys.

128

270

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We prove that arbitrary correlation functions of the H + 3 -WZNW model on a sphere have a simple expression in terms of Liouville theory correlation functions. This is based on the correspondence between the KZ and BPZ equations, and on relations between the structure constants of Liouville theory and the H + 3 -WZNW model. In the critical level limit, these results imply a direct link between eigenvectors of the Gaudin Hamiltonians and the problem of uniformization of Riemann surfaces. We also present an expression for correlation functions of the SL(2)/U (1) gauged WZNW model in terms of correlation functions in Liouville theory. 93.

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Knizhnik-Zamolodchikov equations and spectral flow inAdS₃string theory

Ribault

2005

J. High Energy Phys.

203

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I generalize the Knizhnik-Zamolodchikov equations to correlators of spectral flowed fields in AdS 3 string theory. If spectral flow is preserved or violated by one unit, the resulting equations are equivalent to the KZ equations. If spectral flow is violated by two units or more, only some linear combinations of the KZ equations hold, but extra equations appear. Then I explicitly show how these correlators and the associated conformal blocks are related to Liouville theory correlators and conformal blocks with degenerate field insertions, where each unit of spectral flow violation removes one degenerate field. A similar relation to Liouville theory holds for noncompact parafermions.

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A conformal bootstrap approach to critical percolation in two dimensions

2016

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We study four-point functions of critical percolation in two dimensions, and more generally of the Potts model. We propose an exact ansatz for the spectrum: an infinite, discrete and non-diagonal combination of representations of the Virasoro algebra. Based on this ansatz, we compute four-point functions using a numerical conformal bootstrap approach. The results agree with Monte-Carlo computations of connectivities of random clusters.

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Sylvain Ribault

Branes in the 2D black hole

H₃⁺-WZNW correlators from Liouville theory

Knizhnik-Zamolodchikov equations and spectral flow inAdS₃string theory

A conformal bootstrap approach to critical percolation in two dimensions

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Sylvain Ribault

Branes in the 2D black hole

H3+-WZNW correlators from Liouville theory

Knizhnik-Zamolodchikov equations and spectral flow inAdS3string theory

A conformal bootstrap approach to critical percolation in two dimensions

Contact Info

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H₃⁺-WZNW correlators from Liouville theory

Knizhnik-Zamolodchikov equations and spectral flow inAdS₃string theory