English

Norm attaining dual truncated Toeplitz operators

Functional Analysis 2026-01-15 v1

Abstract

This paper develops a complete framework for understanding when a dual truncated Toeplitz operator (DTTO) attains its norm. Given a nonconstant inner function uu, the DTTO associated with a symbol φL(T)\varphi \in L^{\infty}(\mathbb{T}) acts on the orthogonal complement Ku=uH2H2{\mathcal{K}_u}^{\perp} = uH^{2} \oplus H^{2}_{-} of the model space Ku=H2uH2\mathcal{K}_u = H^{2}\ominus uH^{2}. Assuming φ=1\|\varphi\|_{\infty}=1, we give a characterization of the norm attaining property of DφD_{\varphi} and describe all extremal vectors. A sharp analytic and coanalytic dichotomy emerges DφD_{\varphi} attains its norm precisely when the symbol admits either φ=uψ+χ+\varphi=\overline{u}\overline{\psi}_{+}\chi_{+} or φ=uψχ,\varphi=u\psi_{-}\overline{\chi}_{-}, where ψ±,χ±\psi_{\pm},\chi_{\pm} are inner functions. The first condition corresponds to norm attainment on the analytic component uH2uH^{2}, while the second corresponds to norm attainment on the coanalytic component H2H^{2}_{-} via the natural conjugation CuC_{u}. A key feature of the theory is that the dual compressed shift DuD_{u} (the case φ(z)=z\varphi(z)=z) always attains its norm. We also obtain a coupled Toeplitz, Hankel system governing analytic and coanalytic components of extremal vectors, and provide several concrete examples including nonanalytic unimodular symbols illustrating how the factorization criteria govern norm attainment.

Cite

@article{arxiv.2601.09375,
  title  = {Norm attaining dual truncated Toeplitz operators},
  author = {Sudip Ranjan Bhuia and Puspendu Nag},
  journal= {arXiv preprint arXiv:2601.09375},
  year   = {2026}
}

Comments

33 pages

R2 v1 2026-07-01T09:04:09.491Z