Abstract
AbstractWe study the ‘critical moments’ of subcritical Gaussian multiplicative chaos (GMCs) in dimensions $$d \le 2$$
d
≤
2
. In particular, we establish a fully explicit formula for the leading order asymptotics, which is closely related to large deviation results for GMCs and demonstrates a similar universality feature. We conjecture that our result correctly describes the behaviour of analogous moments of moments of random matrices, or more generally structures which are asymptotically Gaussian and log-correlated in the entire mesoscopic scale. This is verified for an integer case in the setting of circular unitary ensemble, extending and strengthening the results of Claeys et al. and Fahs to higher-order moments.
Funder
European Research Council
Publisher
Springer Science and Business Media LLC
Subject
Mathematical Physics,Statistical and Nonlinear Physics
Reference48 articles.
1. Assiotis, T., Bailey, E.C., Keating, J.P.: On the moments of the moments of the characteristic polynomials of Haar distributed symplectic and orthogonal matrices. Preprint arXiv:1910.12576
2. Assiotis, T., Keating, J.P.: Moments of moments of characteristic polynomials of random unitary matrices and lattice point counts. Random Matrices: Theory and Applications (2021). https://doi.org/10.1142/S2010326321500192
3. Assiotis, T.: On the moments of the partition function of the C$$\beta $$E field. Preprint arXiv:2011.10323
4. Berestycki, N.: An elementary approach to Gaussian multiplicative chaos. Electron. Commun. Probab. 22, 1–12 (2017)
5. Dal Borgo, M., Hovhannisyan, E., Rouault, A.: Mod-Gaussian convergence for random determinants. Ann. Henri Poincaré 20, 259–298 (2019)
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