Saved in:
Bibliographic Details
Main Authors: Blower, Gordon, Doust, Ian
Format: Preprint
Published: 2024
Subjects:
Online Access:https://arxiv.org/abs/2409.15826
Tags: Add Tag
No Tags, Be the first to tag this record!
_version_ 1866912042743496704
author Blower, Gordon
Doust, Ian
author_facet Blower, Gordon
Doust, Ian
contents Let $(-A,B,C)$ be a continuous time linear system with state space a separable complex Hilbert space $H$, where $-A$ generates a strongly continuous contraction semigroup $(e^{-tA})_{t\geq 0}$ on $H$, and $ϕ(t)=Ce^{-tA}B$ is the impulse response function. Associated to such a system is a Hankel integral operator $Γ_ϕ$ acting on $L^2((0, \infty ); C)$ and a Schr{ö}dinger operator whose potential is found via a Fredholm determinant by the Faddeev-Dyson formula. Fredholm determinants of products of Hankel operators also play an important role in the Tracy and Widom's theory of matrix models and asymptotic eigenvalue distributions of random matrices. This paper provide formulas for the Fredholm determinants which arise thus, and determines consequent properties of the associated differential operators. We prove a spectral theorem for self-adjoint linear systems that have scalar input and output: the entries of Kodaira's characteristic matrix are given explicitly with formulas involving the infinitesimal Darboux addition for $(-A,B,C)$. Under suitable conditions on $(-A,B,C)$ we give an explicit version of Burchnall-Chaundy's theorem, showing that the algebra generated by an associated family of differential operators is isomorphic to an algebra of functions on a particular hyperelliptic curve.
format Preprint
id arxiv_https___arxiv_org_abs_2409_15826
institution arXiv
publishDate 2024
record_format arxiv
spellingShingle Linear systems, spectral curves and determinants
Blower, Gordon
Doust, Ian
Spectral Theory
Primary 47C05, secondary 34B30, 58B34
Let $(-A,B,C)$ be a continuous time linear system with state space a separable complex Hilbert space $H$, where $-A$ generates a strongly continuous contraction semigroup $(e^{-tA})_{t\geq 0}$ on $H$, and $ϕ(t)=Ce^{-tA}B$ is the impulse response function. Associated to such a system is a Hankel integral operator $Γ_ϕ$ acting on $L^2((0, \infty ); C)$ and a Schr{ö}dinger operator whose potential is found via a Fredholm determinant by the Faddeev-Dyson formula. Fredholm determinants of products of Hankel operators also play an important role in the Tracy and Widom's theory of matrix models and asymptotic eigenvalue distributions of random matrices. This paper provide formulas for the Fredholm determinants which arise thus, and determines consequent properties of the associated differential operators. We prove a spectral theorem for self-adjoint linear systems that have scalar input and output: the entries of Kodaira's characteristic matrix are given explicitly with formulas involving the infinitesimal Darboux addition for $(-A,B,C)$. Under suitable conditions on $(-A,B,C)$ we give an explicit version of Burchnall-Chaundy's theorem, showing that the algebra generated by an associated family of differential operators is isomorphic to an algebra of functions on a particular hyperelliptic curve.
title Linear systems, spectral curves and determinants
topic Spectral Theory
Primary 47C05, secondary 34B30, 58B34
url https://arxiv.org/abs/2409.15826