We establish a representation of the joint moments of the characteristic polynomial of a CUE random matrix and its derivative in terms of a solution of the -Painlevé V equation. The derivation involves the analysis of a formula for the joint moments in terms of a determinant of generalised Laguerre polynomials using the Riemann–Hilbert method. We use this connection with the -Painlevé V equation to derive explicit formulae for the joint moments and to show that in the large-matrix limit the joint moments are related to a solution of the -Painlevé III equation. Using the conformal block expansion of the -functions associated with the -Painlevé V and the -Painlevé III equations leads to general conjectures for the joint moments
We calculate the moments of the characteristic polynomials of N × N matrices drawn from the Hermitia...
C1 - Journal Articles RefereedAbstract Okamoto has obtained a sequence of τ-functions for the PVI s...
This thesis focuses on the Painlevé IV equation and its relationship with the to double scaling li...
We establish a representation of the joint moments of the characteristic polynomial of a CUE random ...
Following the work of Conrey, Rubinstein and Snaith and Forrester and Witte we examine a mixed momen...
We calculate joint moments of the characteristic polynomial of a random unitary matrix from the circ...
We establish the asymptotics of the joint moments of the characteristic polynomial of a random unita...
In a companion paper \cite{jon-fei}, we established asymptotic formulae for the joint moments of der...
Following the work of Conrey, Rubinstein, and Snaith [Commun. Math. Phys. 267, 611 (2006)] and Forre...
We study expectations of powers and correlation functions for characteristic polynomials of N × N no...
We derive explicit asymptotic formulae for the joint moments of the $n_1$-th and $n_2$-th derivative...
In this thesis we classify all of the special function solutions to Painleve equations and all their...
Denoting by PN(A, θ) = det (I- Ae-iθ) the characteristic polynomial on the unit circle in the comple...
The problem of convergence of the joint moments, which depend on two parameters $s$ and $h$, of the ...
We calculate the moments of the characteristic polynomials of N × N matrices drawn from the Hermitia...
C1 - Journal Articles RefereedAbstract Okamoto has obtained a sequence of τ-functions for the PVI s...
This thesis focuses on the Painlevé IV equation and its relationship with the to double scaling li...
We establish a representation of the joint moments of the characteristic polynomial of a CUE random ...
Following the work of Conrey, Rubinstein and Snaith and Forrester and Witte we examine a mixed momen...
We calculate joint moments of the characteristic polynomial of a random unitary matrix from the circ...
We establish the asymptotics of the joint moments of the characteristic polynomial of a random unita...
In a companion paper \cite{jon-fei}, we established asymptotic formulae for the joint moments of der...
Following the work of Conrey, Rubinstein, and Snaith [Commun. Math. Phys. 267, 611 (2006)] and Forre...
We study expectations of powers and correlation functions for characteristic polynomials of N × N no...
We derive explicit asymptotic formulae for the joint moments of the $n_1$-th and $n_2$-th derivative...
In this thesis we classify all of the special function solutions to Painleve equations and all their...
Denoting by PN(A, θ) = det (I- Ae-iθ) the characteristic polynomial on the unit circle in the comple...
The problem of convergence of the joint moments, which depend on two parameters $s$ and $h$, of the ...
We calculate the moments of the characteristic polynomials of N × N matrices drawn from the Hermitia...
C1 - Journal Articles RefereedAbstract Okamoto has obtained a sequence of τ-functions for the PVI s...
This thesis focuses on the Painlevé IV equation and its relationship with the to double scaling li...