Asymptotic Analysis of Structured Determinants via the Riemann-Hilbert Approach

Gharakhloo, Roozbeh

08 1900

Indiana University-Purdue University Indianapolis (IUPUI) / In this work we use and develop Riemann-Hilbert techniques to study the asymptotic behavior of structured determinants. In chapter one we will review the main underlying definitions and ideas which will be extensively used throughout the thesis. Chapter two is devoted to the asymptotic analysis of Hankel determinants with Laguerre-type and Jacobi-type potentials with Fisher-Hartwig singularities. In chapter three we will propose a Riemann-Hilbert problem for Toeplitz+Hankel determinants. We will then analyze this Riemann-Hilbert problem for a certain family of Toeplitz and Hankel symbols. In Chapter four we will study the asymptotics of a certain bordered-Toeplitz determinant which is related to the next-to-diagonal correlations of the anisotropic Ising model. The analysis is based upon relating the bordered-Toeplitz determinant to the solution of the Riemann-Hilbert problem associated to pure Toeplitz determinants. Finally in chapter ve we will study the emptiness formation probability in the XXZ-spin 1/2 Heisenberg chain, or equivalently, the asymptotic analysis of the associated Fredholm determinant.

Hankel determinants

Toeplitz determinants

Toeplitz+Hankel determinants

Bordered-Toeplitz determinants

Ising model

Emptiness formation probability

Integrable integral operators

Heisenberg spin chain

Riemann-Hilbert problems

Orthogonal polynomials

Asymptotic Analysis of Structured Determinants via the Riemann-Hilbert Approach

Roozbeh Gharakhloo (6943460)

16 December 2020

<div><div>In this work we use and develop Riemann-Hilbert techniques to study the asymptotic behavior of structured determinants. In chapter one we will review the main underlying</div><div>definitions and ideas which will be extensively used throughout the thesis. Chapter two is devoted to the asymptotic analysis of Hankel determinants with Laguerre-type and Jacobi-type potentials with Fisher-Hartwig singularities. In chapter three we will propose a Riemann-Hilbert problem for Toeplitz+Hankel determinants. We will then analyze this Riemann-Hilbert problem for a certain family of Toeplitz and Hankel symbols. In Chapter four we will study the asymptotics of a certain bordered-Toeplitz determinant which is related to the next-to-diagonal correlations of the anisotropic Ising model. The analysis is based upon relating the bordered-Toeplitz determinant to the solution of the Riemann-Hilbert problem associated to pure Toeplitz determinants. Finally in chapter ve we will study the emptiness formation probability in the XXZ-spin 1/2 Heisenberg chain, or equivalently, the asymptotic analysis of the associated Fredholm determinant.</div></div>

Riemann-Hilbert problems

orthogonal polynomials

Hankel determinants

Toeplitz determinants

Toeplitz+Hankel determinants

Bordered-Toeplitz determinants

Ising model

Emptiness formation probability

Integrable integral operators

Heisenberg spin chain

Some Continued Fraction Expansions of Laplace Transforms of Elliptic Functions

Conrad, Eric van Fossen

11 September 2002

No description available.

Mathematics

Jacobi elliptic functions

Dixon elliptic functions

Hankel determinants

Turanian determinants

persymmetric determinants

associated continued fractions

regular C-fractions

Laplace transform