English

A generalization of order continuous operators

Functional Analysis 2019-12-10 v1

Abstract

Let EE be a sublattice of a vector lattice FF. A net {xα}αAE\{ x_\alpha \}_{\alpha \in \mathcal{A}}\subseteq E is said to be F F -order convergent to a vector xE x \in E (in symbols xαFox x_\alpha \xrightarrow{Fo} x in EE), whenever there exists a net {yβ}βB \{y_\beta\}_{\beta \in \mathcal{B}} in FF satisfying yβ0 y_\beta\downarrow 0 in FF and for each β\beta, there exists α0\alpha_0 such that xαxyβ \vert x_\alpha - x \vert \leq y_\beta whenever αα0 \alpha \geq \alpha_0 . In this manuscript, first we study some properties of FF-order convergence nets and we extend some results to the general cases. Let EE and GG be sublattices of vector lattices FF and HH respectively. We introduce FHFH-order continuous operators, that is, an operator TT between two vector lattices EE and GG is said to be FHFH-order continuous, if xαFo0x_\alpha \xrightarrow{Fo} 0 in EE implies TxαHo0Tx_\alpha \xrightarrow{Ho} 0 in GG. We will study some properties of this new classification of operators and its relationships with order continuous operators.

Keywords

Cite

@article{arxiv.1912.04168,
  title  = {A generalization of order continuous operators},
  author = {Mehrdad Bakhshi and Kazem Haghnejad Azar},
  journal= {arXiv preprint arXiv:1912.04168},
  year   = {2019}
}

Comments

arXiv admin note: text overlap with arXiv:1908.03193

R2 v1 2026-06-23T12:40:15.673Z