Dimension results for the spectral measure of the circular \(\beta\) ensembles
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Publication:2108903
DOI10.1214/22-AAP1798zbMath1504.15111arXiv1912.07788OpenAlexW4311548896MaRDI QIDQ2108903
Publication date: 20 December 2022
Published in: The Annals of Applied Probability (Search for Journal in Brave)
Full work available at URL: https://arxiv.org/abs/1912.07788
Random matrices (probabilistic aspects) (60B20) Large deviations (60F10) Random matrices (algebraic aspects) (15B52)
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- Random conformal weldings
- Calogero-Sutherland model and bulk-boundary correlations in conformal field theory
- Quantum Loewner evolution
- Liouville quantum gravity and KPZ
- The analysis of additive set functions in Euclidean space
- The characteristic polynomial of a random unitary matrix and Gaussian multiplicative chaos -- the \(L^2\)-phase
- Sum rules via large deviations
- Thick points of the Gaussian free field
- Eigenvalue statistics for CMV matrices: From Poisson to clock via random matrix ensembles
- Power-law subordinacy and singular spectra. I: Half-line operators
- Large deviations and sum rules for spectral theory: a pedagogical approach
- Large deviations and the Lukic conjecture
- Sum rules and large deviations for spectral matrix measures
- Rigidity of the \(\operatorname{Sine} _{\beta }\) process
- Five-diagonal matrices and zeros of orthogonal polynomials on the unit circle
- On the maximum of the C\(\beta\)E field
- The Fyodorov-Bouchaud formula and Liouville conformal field theory
- Additive set functions in Euclidean space. II
- Quantum dynamics and decompositions of singular continuous spectra
- An elementary approach to Gaussian multiplicative chaos
- Critical Liouville measure as a limit of subcritical measures
- Sum rules and large deviations for spectral measures on the unit circle
- Statistical Theory of the Energy Levels of Complex Systems. I
- Random discrete Schrödinger operators from random matrix theory
- Freezing and extreme-value statistics in a random energy model with logarithmically correlated potential
- Spectral and dynamical properties of certain random Jacobi matrices with growing parameters
- Circular Jacobi Ensembles and Deformed Verblunsky Coefficients
- Probability with Martingales
- Operator limits of random matrices
- Multiplicative chaos and the characteristic polynomial of the CUE: The 𝐿¹-phase
- CMV: The unitary analogue of Jacobi matrices
- Proof of a Conjecture by Dyson
- Probability
