Symmetry, Integrability and Geometry: Methods and Applications (SIGMA)

SIGMA 16 (2020), 100, 47 pages      arXiv:1909.00963      https://doi.org/10.3842/SIGMA.2020.100

A Riemann-Hilbert Approach to Asymptotic Analysis of Toeplitz+Hankel Determinants

Roozbeh Gharakhloo ^a and Alexander Its ^bc
a) Department of Mathematics, Colorado State University, 1874 Campus Delivery, Fort Collins, CO 80523-1874, USA
^b) Department of Mathematical Sciences, Indiana University-Purdue University Indianapolis, 402 N. Blackford St., Indianapolis, IN 46202, USA
^c) St. Petersburg State University, Universitetskaya emb. 7/9, 199034, St. Petersburg, Russia

Received November 03, 2019, in final form August 26, 2020; Published online October 06, 2020

Abstract
In this paper we will formulate $4\times4$ Riemann-Hilbert problems for Toeplitz+Hankel determinants and the associated system of orthogonal polynomials, when the Hankel symbol is supported on the unit circle and also when it is supported on an interval $[a,b]$, $0$<$a$<$b$<$1$. The distinguishing feature of this work is that in the formulation of the Riemann-Hilbert problem no specific relationship is assumed between the Toeplitz and Hankel symbols. We will develop nonlinear steepest descent methods for analysing these problems in the case where the symbols are smooth (i.e., in the absence of Fisher-Hartwig singularities) and admit an analytic continuation in a neighborhood of the unit circle (if the symbol's support is the unit circle). We will finally introduce a model problem and will present its solution requiring certain conditions on the ratio of Hankel and Toeplitz symbols. This in turn will allow us to find the asymptotics of the norms $h_n$ of the corresponding orthogonal polynomials and, in fact, the large $n$ asymptotics of the polynomials themselves. We will explain how this solvable case is related to the recent operator-theoretic approach in [Basor E., Ehrhardt T., in Large Truncated Toeplitz Matrices, Toeplitz Operators, and Related Topics, Oper. Theory Adv. Appl., Vol. 259, Birkhäuser/Springer, Cham, 2017, 125-154, arXiv:1603.00506] to Toeplitz+Hankel determinants. At the end we will discuss the prospects of future work and outline several technical, as well as conceptual, issues which we are going to address next within the $4\times 4$ Riemann-Hilbert framework introduced in this paper.

Key words: Toeplitz+Hankel determinants; Riemann-Hilbert problem; asymptotic analysis.

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References

1. Baik J., Deift P., Johansson K., On the distribution of the length of the longest increasing subsequence of random permutations, J. Amer. Math. Soc. 12 (1999), 1119-1178, arXiv:math.CO/9810105.
2. Basor E., Ehrhardt T., Asymptotic formulas for determinants of a special class of Toeplitz + Hankel matrices, in Large Truncated Toeplitz Matrices, Toeplitz Operators, and Related Topics, Oper. Theory Adv. Appl., Vol. 259, Birkhäuser/Springer, Cham, 2017, 125-154, arXiv:1603.00506.
3. Basor E.L., Ehrhardt T., Asymptotic formulas for determinants of a sum of finite Toeplitz and Hankel matrices, Math. Nachr. 228 (2001), 5-45, arXiv:math.FA/9809088.
4. Basor E.L., Ehrhardt T., Asymptotic formulas for the determinants of symmetric Toeplitz plus Hankel matrices, in Toeplitz Matrices and Singular Integral Equations (Pobershau, 2001), Oper. Theory Adv. Appl., Vol. 135, Birkhäuser, Basel, 2002, 61-90, arXiv:math.FA/0202078.
5. Basor E.L., Ehrhardt T., Determinant computations for some classes of Toeplitz-Hankel matrices, Oper. Matrices 3 (2009), 167-186, arXiv:0804.3073.
6. Basor E.L., Ehrhardt T., Fredholm and invertibility theory for a special class of Toeplitz + Hankel operators, J. Spectr. Theory 3 (2013), 171-214, arXiv:1110.0577.
7. Böttcher A., Grudsky S.M., Spectral properties of banded Toeplitz matrices, Society for Industrial and Applied Mathematics (SIAM), Philadelphia, PA, 2005.
8. Böttcher A., Silbermann B., Introduction to large truncated Toeplitz matrices, Universitext, Springer-Verlag, New York, 1999.
9. Böttcher A., Silbermann B., Analysis of Toeplitz operators, 2nd ed., Springer Monographs in Mathematics, Springer-Verlag, Berlin, 2006.
10. Charlier C., Asymptotics of Hankel determinants with a one-cut regular potential and Fisher-Hartwig singularities, Int. Math. Res. Not. 2019 (2019), 7515-7576, arXiv:1706.03579.
11. Charlier C., Gharakhloo R., Asymptotics of Hankel determinants with a Laguerre-type or Jacobi-type potential and Fisher-Hartwig singularities, arXiv:1902.08162.
12. Chelkak D., Hongler C., Mahfouf R., Magnetization in the zig-zag layered Ising model and orthogonal polynomials, arXiv:1904.09168.
13. Deift P., Its A., Krasovsky I., Asymptotics of Toeplitz, Hankel, and Toeplitz+Hankel determinants with Fisher-Hartwig singularities, Ann. of Math. 174 (2011), 1243-1299, arXiv:0905.0443.
14. Deift P., Its A., Krasovsky I., Eigenvalues of Toeplitz matrices in the bulk of the spectrum, Bull. Inst. Math. Acad. Sin. (N.S.) 7 (2012), 437-461, arXiv:1110.4089.
15. Deift P., Its A., Krasovsky I., Toeplitz matrices and Toeplitz determinants under the impetus of the Ising model: some history and some recent results, Comm. Pure Appl. Math. 66 (2013), 1360-1438, arXiv:1207.4990.
16. Deift P., Kriecherbauer T., McLaughlin K.T.-R., Venakides S., Zhou X., Strong asymptotics of orthogonal polynomials with respect to exponential weights, Comm. Pure Appl. Math. 52 (1999), 1491-1552.
17. Deift P., Kriecherbauer T., McLaughlin K.T.-R., Venakides S., Zhou X., Uniform asymptotics for polynomials orthogonal with respect to varying exponential weights and applications to universality questions in random matrix theory, Comm. Pure Appl. Math. 52 (1999), 1335-1425.
18. Fedele E., Gebert M., On determinants identity minus Hankel matrix, Bull. Lond. Math. Soc. 51 (2019), 751-764, arXiv:1808.08009.
19. Its A., Krasovsky I., Hankel determinant and orthogonal polynomials for the Gaussian weight with a jump, in Integrable Systems and Random Matrices, Contemp. Math., Vol. 458, Amer. Math. Soc., Providence, RI, 2008, 215-247, arXiv:0706.3192.
20. Krasovsky I., Correlations of the characteristic polynomials in the Gaussian unitary ensemble or a singular Hankel determinant, Duke Math. J. 139 (2007), 581-619, arXiv:math-ph/0411016.
21. Krasovsky I., Aspects of Toeplitz determinants, in Random Walks, Boundaries and Spectra, Progr. Probab., Vol. 64, Birkhäuser/Springer Basel AG, Basel, 2011, 305-324, arXiv:1007.1128.