Nonisospectral flows on semiinfinite unitary block Jacobi matrices

A. A. Mokhonko

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A. A. Mokhonko

Abstract

It is proved that if the spectrum and spectral measure of a unitary operator generated by a semiinfinite block Jacobi matrix

$J(t)$ vary appropriately, then the corresponding operator

$\textbf{J}(t)$ satisfies the generalized Lax equation

$\dot{\textbf{J}}(t) = \Phi(\textbf{J}(t), t) + [\textbf{J}(t), A(\textbf{J}(t), t)]$ , where

$\Phi(\lambda, t)$ is a polynomial in

$\lambda$ and

$\overline{\lambda}$ with

$t$ -dependent coefficients and

$A(J(t), t) = \Omega + I + \frac12 \Psi$ is a skew-symmetric matrix.
The operator

$J(t$ ) is analyzed in the space

${\mathbb C}\oplus{\mathbb C}^2\oplus{\mathbb C}^2\oplus...$ . It is mapped into the unitary operator of multiplication

$L(t)$ in the isomorphic space

$L^2({\mathbb T}, d\rho)$ , where

${\mathbb T} = {z: |z| = 1}$ . This fact enables one to construct an efficient algorithm for solving the block lattice of differential equations generated by the Lax equation. A procedure that allows one to solve the corresponding Cauchy problem by the Inverse-Spectral-Problem method is presented.
The article contains examples of block difference-differential lattices and the corresponding flows that are analogues of the Toda and van Moerbeke lattices (from self-adjoint case on

${\mathbb R}$ ) and some notes about applying this technique for Schur flow (unitary case on

${\mathbb T}$ and OPUC theory).

Nonisospectral flows on semiinfinite unitary block Jacobi matrices

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