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Asymptotics of Hankel determinants with a multi-cut regular potential and Fisher-Hartwig singularities

Charlier, Christophe; Fahs, Benjamin; Webb, Christian; Wong, Mo Dick

Asymptotics of Hankel determinants with a multi-cut regular potential and Fisher-Hartwig singularities Thumbnail


Authors

Christophe Charlier

Benjamin Fahs

Christian Webb



Abstract

We obtain large $N$ asymptotics for $N \times N$ Hankel determinants corresponding to non-negative symbols with Fisher-Hartwig (FH) singularities in the multi-cut regime. Our result includes the explicit computation of the multiplicative constant. More precisely, we consider symbols of the form $\omega e^{f-NV}$ , where $V$ is a real-analytic potential whose equilibrium measure $\mu_V$ is supported on several intervals, $f$ is analytic in a neighborhood of supp$(\mu_V)$, and $\omega$ is a function with any number of jump- and root-type singularities in the interior of supp$(\mu_V)$. While the special cases $\omega \equiv 1$ and $\omega e^f \equiv 1$ have been considered previously in the literature, we also prove new results for these special cases. No prior asymptotics were available in the literature for symbols with FH singularities in the multi-cut setting. As an application of our results, we discuss a connection between the spectral fluctuations of random Hermitian matrices in the multi-cut regime and the Gaussian free field on the Riemann surface associated to $\mu_V$ . As a second application, we obtain new rigidity estimates for random Hermitian matrices in the multi-cut regime.

Citation

Charlier, C., Fahs, B., Webb, C., & Wong, M. D. (in press). Asymptotics of Hankel determinants with a multi-cut regular potential and Fisher-Hartwig singularities. Memoirs of the American Mathematical Society,

Journal Article Type Article
Acceptance Date Jan 25, 2023
Deposit Date Mar 6, 2023
Publicly Available Date Mar 7, 2023
Journal Memoirs of the American Mathematical Society
Print ISSN 0065-9266
Electronic ISSN 1947-6221
Publisher American Mathematical Society
Peer Reviewed Peer Reviewed
Public URL https://durham-repository.worktribe.com/output/1177678
Publisher URL https://www.ams.org/cgi-bin/mstrack/accepted_papers/memo
Related Public URLs https://doi.org/10.48550/arXiv.2111.08395

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