English

Regular matrices of unbounded linear operators

Functional Analysis 2025-08-20 v2

Abstract

Let X,YX,Y be Banach spaces, and fix a linear operator TL(X,Y)T \in \mathcal{L}(X,Y), and ideals I,J\mathcal{I}, \mathcal{J} on ω\omega. We obtain Silverman--Toeplitz type theorems on matrices A=(An,k:n,kω)A=(A_{n,k}: n,k \in \omega) of linear operators in L(X,Y)\mathcal{L}(X,Y), so that J-limAx=T(I-limx) \mathcal{J}\text{-}\lim Ax=T(\hspace{.2mm}\mathcal{I}\text{-}\lim x) for every XX-valued sequence x=(x0,x1,)x=(x_0,x_1,\ldots) which is I\mathcal{I}-convergent [and bounded]. This allows us to establish the relationship between the classical Silverman--Toeplitz characterization of regular matrices and its multidimensional analogue for double sequences, its variant for matrices of linear operators, and the recent version (for the scalar case) in the context of ideal convergence. As byproducts, we obtain characterizations of several matrix classes and a generalization of the classical Hahn--Schur theorem. In the proofs we will use an ideal version of the Banach--Steinhaus theorem which has been recently obtained by De Bondt and Vernaeve in [J.~Math.~Anal.~Appl.~\textbf{495} (2021)].

Keywords

Cite

@article{arxiv.2201.13059,
  title  = {Regular matrices of unbounded linear operators},
  author = {Paolo Leonetti},
  journal= {arXiv preprint arXiv:2201.13059},
  year   = {2025}
}

Comments

Accepted in Proceedings of the Royal Society of Edinburgh, Section A: Mathematics

R2 v1 2026-06-24T09:10:13.650Z