Brownian Loops, Layering Fields and Imaginary Gaussian Multiplicative Chaos

Camia, Federico; Gandolfi, Alberto; PECCATI, Giovanni; Reddy, Tulasi

doi:10.1007/s00220-020-03932-9

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Article (Périodiques scientifiques)

Brownian Loops, Layering Fields and Imaginary Gaussian Multiplicative Chaos

Camia, Federico; Gandolfi, Alberto; PECCATI, Giovanni et al.

2021 • In Communications in Mathematical Physics, 381 (3), p. 889-945

Peer reviewed vérifié par ORBi

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https://hdl.handle.net/10993/42581

DOI
10.1007/s00220-020-03932-9

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Détails

Disciplines :

Mathématiques

Auteur, co-auteur :

Camia, Federico; New York University at Abu Dhabi > Department of Mathematics

Gandolfi, Alberto; New York University at Abu Dhabi > Department of Mathematics

PECCATI, Giovanni ; University of Luxembourg > Faculty of Science, Technology and Communication (FSTC) > Mathematics Research Unit

Reddy, Tulasi; New York University at Abu Dhabi > Department of Mathematics

Co-auteurs externes :

yes

Langue du document :

Anglais

Titre :

Brownian Loops, Layering Fields and Imaginary Gaussian Multiplicative Chaos

Date de publication/diffusion :

2021

Titre du périodique :

Communications in Mathematical Physics

ISSN :

0010-3616

eISSN :

1432-0916

Maison d'édition :

Springer, Allemagne

Volume/Tome :

381

Fascicule/Saison :

Pagination :

889-945

Peer reviewed :

Peer reviewed vérifié par ORBi

Projet FnR :

FNR11756789 - Fluctuations Of Random Geometric Structures, 2017 (01/06/2018-30/11/2021) - Giovanni Peccati

Disponible sur ORBilu :

depuis le 20 février 2020

Statistiques

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107 (dont 5 Unilu)

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Bibliographie

Aizenman, M.: Geometric analysis of ϕ4 fields and Ising models. Parts I and II. Commun. Math. Phys. 86, 1–48 (1982)
Astala, K., Jones, P., Kupiainen, A., Saksman, E.: Random conformal weldings. Acta Math. 207(2), 203–254 (2011)
Belavin, A.A., Polyakov, A.M., Zamolodchikov, A.B.: Infinite conformal symmetry in two-dimensional quantum field theory. Nucl. Phys. B 241(2), 333–380 (1984)
Belavin, A.A., Polyakov, A.M., Zamolodchikov, A.B.: Infinite conformal symmetry of critical fluctuations in two dimensions. J. Stat. Phys. 34(5–6), 763–774 (1984)
Berestycki, N.: An elementary approach to Gaussian multiplicative chaos. Electron. Commun. Probab. 22(27), 12 (2017)
Berestycki, N., Webb, C., Wong, M.D.: Random Hermitian matrices and Gaussian multiplicative chaos. Probab. Theory Relat. Fields 172(1–2), 103–189 (2018)
Bers, L., John, F., Schechter, M.: Partial differential equations. Lectures in Applied Mathematics 3A, American Mathematical Society (1964)
Borodin, A., Ferrari, P.: Anisotropic growth of random surfaces in 2+1 dimensions. Commun. Math. Phys. 325(2), 603–684 (2014)
Broman, E.I., Camia, F.: Universal behavior of connectivity properties in fractal percolation models. Electron. J. Probab. 15, 1394–1414 (2010)
Brydges, D.C., Fröhlich, J., Sokal, A.D.: The random-walk representation of classical spin systems and correlation inequalities. II. The skeleton inequalities. Commun. Math. Phys. 91, 117–139 (1983)
Brydges, D.C., Fröhlich, J., Spencer, T.: The random walk representation of classical spin systems and correlation inequalities. Commun. Math. Phys. 83, 123–150 (1982)
Camia, F.: Scaling limits, Brownian loops and conformal fields. In: Advances in Disordered Systems, Random Processes and Some Applications, pp. 205–269. Cambridge Univ. Press, Cambridge (2017)
Camia, F., Foit, V.F., Gandolfi, A., Kleban, M.: Exact correlation functions in the Brownian loop soup. J. High Energy Phys. 2020, 067 (2020)
Camia, F., Gandolfi, A., Kleban, M.: Conformal correlation functions in the Brownian loop soup. Nucl. Phys. B 902, 483–507 (2016)
Camia, F., Garban, C., Newman, C.M.: Planar Ising magnetization field I. Uniqueness of the critical scaling limit. Ann. Probab. 43, 528–571 (2015)
Camia, F., Garban, C., Newman, C.M.: Planar Ising magnetization field II. Properties of the critical and near-critical scaling limits. Ann. Inst. H. Poincaré Probab. Stat. 52, 146–161 (2016)
Carpentier, D., Le Doussal, P.: Glass transition of a particle in a random potential, front selection in nonlinear RG and entropic phenomena in Liouville and Sinh-Gordon models. Phys. Rev. E 63, 026110 (2001)
David, F., Kupiainen, A., Rhodes, R., Vargas, V.: Liouville quantum gravity on the Riemann sphere. Commun. Math. Phys. 342(3), 869–907 (2016)
Di Francesco, P., Mathieu, P., Sénéchal, D.: Conformal Field Theory. Graduate Texts in Contemporary Physics. Springer, New York (1997)
Dynkin, E.B.: Markov processes as a tool in field theory. J. Funct. Anal. 50, 167–187 (1983)
Dynkin, E.B.: Gaussian and non-Gaussian random fields associated with Markov processes. J. Funct. Anal. 55, 344–376 (1984)
Duplantier, B., Sheffield, S.: Liouville quantum gravity and KPZ. Invent. Math. 185(2), 333–393 (2011)
Fernández, R., Fröhlich, J., Sokal, A.D.: Random Walks, Critical Phenomena, and Triviality in Quantum Field Theory. Springer, Berlin (1992)
Freivogel, B., Kleban, M.: A conformal field theory for eternal inflation? J. High Energy Phys. 12, 019, 31 (2009)
Gamsa, A., Cardy, J.: Correlation functions of twist operators applied to single self-avoiding loops. J. Phys. A 39, 12983 (2006)
Grieser, D.: Uniform bounds for eigenfunctions of the Laplacian on manifolds with boundary. Commun. Partial Differ. Equ. 27(7–8), 1283–1299 (2002)
Han, Y., Wang, Y., Zinsmeister, M.: On the Brownian loop measure. J. Stat. Phys. 175, 987–1005 (2019)
Henkel, M.: Conformal Invariance and Critical Phenomena. Texts and Monographs in Physics. Springer, Berlin (1999)
Junnila, J., Saksman, E., Webb, C.: Imaginary multiplicative chaos: Moments, regularity and connections to the Ising model. Ann. Appl. Probab. 30, 2099–2164 (2020)
Kahane, J.P.: Sur le chaos multiplicatif. Ann. Sci. Math. Québec 9(2), 105–150 (1985)
Kupiainen, A., Rhodes, R., Vargas, V.: Integrability of Liouville theory: proof of the DOZZ formula. Ann. Math. 191, 81–166 (2020)
Lacoin, H., Rhodes, R., Vargas, V.: Complex Gaussian multiplicative chaos. Commun. Math. Phys. 337(2), 569–632 (2015)
Lambert, G., Ostrovsky, D., Simm, N.: Subcritical multiplicative chaos for regularized counting statistics from random matrix theory. Commun. Math. Phys. 360(1), 1–54 (2018)
Last, G.: Stochastic analysis for Poisson processes. In: Stochastic Analysis for Poisson Point Processes, volume 7 of Bocconi & Springer Ser., pp. 1–36. Springer International Publishing (2016)
Last, G., Penrose, M.: Lectures on the Poisson Process. Institute of Mathematical Statistics Textbooks, vol. 7. Cambridge University Press, Cambridge (2018)
Last, G., Penrose, M.: Poisson process Fock space representation, chaos expansion and covariance inequalities. Probab. Theory Relat. Fields 150(3–4), 663–690 (2011)
Lawler, G.F.: Conformally Invariant Processes in the Plane. Mathematical Surveys and Monographs, vol. 114. American Mathematical Society, Providence (2005)
Lawler, G.F., Werner, W.: The Brownian loop soup. Probab. Theory Relat. Fields 128(4), 565–588 (2004)
Le Jan, Y.: Markov loops and renormalization. Ann. Probab. 38, 1280–1319 (2010)
Le Jan, Y.: Markov paths, loops and fields. Lecture Notes in Mathematics, vol. 2026. Ecole d’Eté de Probabilité de St. Flour, Springer, Berlin (2012)
Le Jan, Y.: Brownian winding fields (2018). arXiv preprint arXiv:1811.02737
Mandelbrot, B.: Intermittent turbulence in self-similar cascades: divergence of high moments and dimension of the carrier. J. Fluid Mech. 62(2), 331–358 (1974)
Miller, J., Sheffield, S.: Imaginary geometry I: interacting SLEs. Probab. Theory Relat. Fields 164(3–4), 553–705 (2016)
Nacu, S., Werner, W.: Random soups, carpets and fractal dimensions. J. Lond. Math. Soc. 83(3), 789–809 (2011)
Nikula, M., Saksman, E., Webb, C.: Multiplicative chaos and the characteristic polynomial of the cue: the L1 -phase (2018). Preprint arXiv:1806.01831
Nourdin, I., Peccati, G.: Normal Approximations with Malliavin Calculus: From Stein’s Method to Universality. Cambridge Tracts in Mathematics, vol. 192. Cambridge University Press, Cambridge (2012)
Peccati, G., Taqqu, M.S.: Wiener Chaos: Moments, Cumulants and Diagrams: A Survey with Computer Implementation (supplementary material available online). Bocconi & Springer Series, vol. 1. Springer, Milan (2011)
Polyakov, A.M.: Conformal symmetry of critical fluctuations. JETP Lett. 12, 381–383 (1970)
Pommerenke, C.: Boundary behaviour of conformal maps. Grundlehren der Mathematischen Wissenschaften [Fundamental Principles of Mathematical Sciences], vol. 299. Springer, Berlin (1992)
Rhodes, R., Vargas, V.: Gaussian multiplicative chaos and Liouville quantum gravity. In: Stochastic Processes and Random Matrices, pp. 548–577. Oxford Univ. Press, Oxford (2017)
Robert, R., Vargas, V.: Gaussian multiplicative chaos revisited. Ann. Probab. 38(2), 605–631 (2010)
Saksman, E., Webb, C.: Multiplicative chaos measures for a random model of the Riemann zeta function (2016). arXiv preprint arXiv:1604.08378
Shamov, A.: On Gaussian multiplicative chaos. J. Funct. Anal. 270(9), 3224–3261 (2016)
Sheffield, S.: Exploration trees and conformal loop ensembles. Duke Math. J. 147, 79–129 (2009)
Sheffield, S.: Conformal weldings of random surfaces: SLE and the quantum gravity zipper. Ann. Probab. 44(5), 3474–3545 (2016)
Sheffield, S., Werner, W.: Conformal loop ensembles: the Markovian characterization and the loop-soup construction. Ann. Math. 176, 1827–1917 (2012)
Stroock, D.W.: Homogeneous chaos revisited. In: Séminaire de Probabilités, XXI, volume 1247 of Lecture Notes in Math., pp 1–7. Springer, Berlin (1987)
Surgailis, D.: Zones of attraction of self-similar multiple integrals. Lith. Math. J. 22(3), 327–340 (1982)
Symanzik, K.: Euclidean quantum field theory. In: Jost, R. (ed.) Local Quantum Theory, Proceedings of the International School of Physics “Enrico Fermi,” course 4s, pp. 152–223. Academic Press, New York (1969)
Sznitman, A.S.: Topics in Occupation Times and Gaussian Free Field, Zürich Lectures in Advanced Mathematics, European Mathematical Society Publishing House, Zürich (2012)
van de Brug, T., Camia, F., Lis, M.: Spin systems from loop soups. Electron. J. Probab. 23, 17 (2018)
Webb, C.: The characteristic polynomial of a random unitary matrix and Gaussian multiplicative chaos–the L2 -phase. Electron. J. Probab. 20(104), 21 (2015)
Werner, W.: SLEs as boundaries of clusters of Brownian loops. C. R. Acad. Sci. Ser. I Math. 337, 481–486 (2003)
Werner, W.: Some recent aspects of random conformally invariant systems. In: Bovier, A., Dunlop, F., van Enter, A., Dalibard, J. (eds.) Les Houches Scool Proceedings: Session LXXXII, Mathematical Statistical Physics, pp. 57–98. Elsevier, Amsterdam (2006)
Werner, W.: The conformally invariant measure on self-avoiding loops. J. Am. Math. Soc. 21(1), 137–169 (2008)
Weyl, H.: Über die asymptotische Verteilung der Eigenwerte. Nachrichten von der Gesellschaft der Wissenschaften zu Göttingen, Mathematisch-Physikalische Klasse 110–117, 1911 (1911)