English

An extremal problem for functions annihilated by a Toeplitz operator

Complex Variables 2021-04-30 v3 Classical Analysis and ODEs Functional Analysis

Abstract

For a bounded function φ\varphi on the unit circle T\mathbb T, let TφT_\varphi be the associated Toeplitz operator on the Hardy space H2H^2. Assume that the kernel K2(φ):={fH2:Tφf=0}K_2(\varphi):=\{f\in H^2:\,T_\varphi f=0\} is nontrivial. Given a unit-norm function ff in K2(φ)K_2(\varphi), we ask whether an identity of the form f2=12(f12+f22)|f|^2=\frac12\left(|f_1|^2+|f_2|^2\right) may hold a.e. on T\mathbb T for some f1,f2K2(φ)f_1,f_2\in K_2(\varphi), both of norm 11 and such that f1f2|f_1|\ne|f_2| on a set of positive measure. We then show that such a decomposition is possible if and only if either ff or zφf\overline{z\varphi f} has a nontrivial inner factor. The proof relies on an intrinsic characterization of the moduli of functions in K2(φ)K_2(\varphi), a result which we also extend to Kp(φ)K_p(\varphi) (the kernel of TφT_\varphi in HpH^p) with 1p1\le p\le\infty.

Keywords

Cite

@article{arxiv.1812.06586,
  title  = {An extremal problem for functions annihilated by a Toeplitz operator},
  author = {Konstantin M. Dyakonov},
  journal= {arXiv preprint arXiv:1812.06586},
  year   = {2021}
}

Comments

10 pages

R2 v1 2026-06-23T06:44:06.987Z