Transformations of Nevanlinna operator-functions and their fixed points (1706.00982v1)
Abstract: We give a new characterization of the class ${\bf N}0_{\mathfrak M}[-1,1]$ of the operator-valued in the Hilbert space ${\mathfrak M}$ Nevanlinna functions that admit representations as compressed resolvents ($m$-functions) of selfadjoint contractions. We consider the automorphism ${\bf \Gamma}:$ $M(\lambda){\mapsto}M_{{\bf \Gamma}}(\lambda):=\left((\lambda2-1)M(\lambda)\right){-1}$ of the class ${\bf N}0_{\mathfrak M}[-1,1]$ and construct a realization of $M_{{\bf \Gamma}}(\lambda)$ as a compressed resolvent. The unique fixed point of ${\bf\Gamma}$ is the $m$-function of the block-operator Jacobi matrix related to the Chebyshev polynomials of the first kind. We study a transformation ${\bf\widehat \Gamma}:$ ${\mathcal M}(\lambda)\mapsto {\mathcal M}{{\bf\widehat \Gamma}}(\lambda) :=-({\mathcal M}(\lambda)+\lambda I{\mathfrak M}){-1}$ that maps the set of all Nevanlinna operator-valued functions into its subset. The unique fixed point $\mathcal M_0$ of ${\bf\widehat\Gamma}$ admits a realization as the compressed resolvent of the "free" discrete Schr\"{o}dinger operator ${\bf\widehat J}0$ in the Hilbert space ${\bf H}_0=\ell2(\mathbb N_0)\bigotimes{\mathfrak M}$. We prove that ${\mathcal M}_0$ is the uniform limit on compact sets of the open upper/lower half-plane in the operator norm topology of the iterations ${{\mathcal M}{n+1}(\lambda)=-({\mathcal M}n(\lambda)+\lambda I\mathfrak M){-1}}$ of ${\bf\widehat\Gamma}$. We show that the pair ${{\bf H}_0,{\bf \widehat J}_0}$ is the inductive limit of the sequence of realizations ${\widehat{\mathfrak H}_n,\widehat A_n}$ of ${{\mathcal M}_n}$. In the scalar case $({\mathfrak M}={\mathbb C})$, applying the algorithm of I.S.~Kac, a realization of iterates ${{\mathcal M}_n}$ as $m$-functions of canonical (Hamiltonian) systems is constructed.