English

Minimal invariant subspaces for an affine composition operator

Functional Analysis 2023-11-17 v2

Abstract

The composition operator Cϕaf=fϕaC_{\phi_a}f=f\circ\phi_a on the Hardy-Hilbert space H2(D)H^2(\mathbb{D}) with affine symbol ϕa(z)=az+1a\phi_a(z)=az+1-a and 0<a<10<a<1 has the property that the Invariant Subspace Problem for complex separable Hilbert spaces holds if and only if every minimal invariant subspace for CϕaC_{\phi_a} is one-dimensional. These minimal invariant subspaces are always singly-generated Kf:=span{f,Cϕaf,Cϕa2f,} K_f := \overline{\mathrm{span} \{f, C_{\phi_a}f, C^2_{\phi_a}f, \ldots \}} for some fH2(D)f\in H^2(\mathbb{D}). In this article we characterize the minimal KfK_f when ff has a nonzero limit at the point 11 or if its derivative ff' is bounded near 11. We also consider the role of the zero set of ff in determining KfK_f. Finally we prove a result linking universality in the sense of Rota with cyclicity.

Keywords

Cite

@article{arxiv.2306.09439,
  title  = {Minimal invariant subspaces for an affine composition operator},
  author = {João R. Carmo and Ben Hur Eidt and S. Waleed Noor},
  journal= {arXiv preprint arXiv:2306.09439},
  year   = {2023}
}

Comments

13 pages

R2 v1 2026-06-28T11:06:31.800Z