English

Inverse of generalized Nevanlinna function that is holomorphic at infinity

Functional Analysis 2020-02-17 v1 Complex Variables

Abstract

Let (H,(.,.))\left(\mathcal{H},\left(.,.\right)\right) be a Hilbert space and let L(H)\mathcal{L}\left(\mathcal{H}\right) be the linear space of bounded operators in H\mathcal{H}. In this paper, we deal with L(H)\mathcal{L}(\mathcal{H})-valued function QQ that belongs to the generalized Nevanlinna class Nκ(H)\mathcal{N}_{\kappa} (\mathcal{H}), where κ\kappa is a non-negative integer. It is the class of functions meromorphic on C\RC \backslash R, such that Q(z)=Q(zˉ)Q(z)^{*}=Q(\bar{z}) and the kernel NQ(z,w):=Q(z)Q(w)zwˉ\mathcal{N}_{Q}\left( z,w \right):=\frac{Q\left( z \right)-{Q\left( w \right)}^{\ast }}{z-\bar{w}} has κ\kappa negative squares. A focus is on the functions QNκ(H)Q \in \mathcal{N}_{\kappa} (\mathcal{H}) which are holomorphic at \infty. A new operator representation of the inverse function Q^(z):=Q(z)1\hat{Q}\left( z \right):=-{Q\left( z \right)}^{-1} is obtained under the condition that the derivative at infinity Q():=limzzQ(z)Q^{'}\left( \infty\right):=\lim\limits_{z\to \infty}{zQ(z)} is boundedly invertible operator. It turns out that Q^\hat{Q} is the sum Q^=Q^1+Q^2,Q^iNκi(H)\hat{Q}=\hat{Q}_{1}+\hat{Q}_{2},\, \, \hat{Q}_{i}\in \mathcal{N}_{\kappa_{i}}\left( \mathcal{H} \right) that satisfies κ1+κ2=κ\kappa_{1}+\kappa_{2}=\kappa . That decomposition enables us to study properties of both functions, QQ and Q^\hat{Q}, by studying the simple components Q^1\hat{Q}_{1} and Q^2\hat{Q}_{2}.

Cite

@article{arxiv.2001.09366,
  title  = {Inverse of generalized Nevanlinna function that is holomorphic at infinity},
  author = {Muhamed Borogovac},
  journal= {arXiv preprint arXiv:2001.09366},
  year   = {2020}
}

Comments

19 pages

R2 v1 2026-06-23T13:20:41.739Z