English

Bergman inner functions and $m$-hypercontractions

Functional Analysis 2017-06-16 v1

Abstract

Let Hm(B,D)H_m(\mathbb B,\mathcal D) be the D\mathcal D-valued functional Hilbert space with reproducing kernel Km(z,w)=(1z,w)m1DK_m(z,w) = (1-\langle z,w\rangle)^{-m}1_{\mathcal D}. A KmK_m-inner function is by definition an operator-valued analytic function W:BL(E,D)W: \mathbb B \rightarrow L(\mathcal E, \mathcal D) such that WxHm(B,D)=x\|Wx\|_{H_m(\mathbb B,\mathcal D)} = \|x\| for all xEx \in \mathcal E and (WE)Mzα(WE)(W\mathcal E) \perp M_z^{\alpha}(W\mathcal E) for all αNn{0}\alpha \in \mathbb N^n \setminus \{0\}. We show that the KmK_m-inner functions are precisely the functions of the form W(z)=D+Ck=1m(1ZT)kZBW(z) = D + C \sum^m_{k=1}(1 - ZT^*)^{-k}ZB, where TL(H)nT \in L(H)^n is a pure mm-hypercontraction and the operators T,B,C,DT^*, B, C,D form a 2×22 \times 2-operator matrix satisfying suitable conditions. Thus we extend results proved by Olofsson on the unit disc to the case of the unit ball BCn\mathbb B \subset \mathbb C^n.

Keywords

Cite

@article{arxiv.1706.04874,
  title  = {Bergman inner functions and $m$-hypercontractions},
  author = {Jörg Eschmeier},
  journal= {arXiv preprint arXiv:1706.04874},
  year   = {2017}
}
R2 v1 2026-06-22T20:19:45.345Z