Laterally closed lattice homomorphisms

Abstract: Let A and B be two Archimedean vector lattices and let T : A → B be a lattice homomorphism. We call that T is laterally closed if T (D) is a maximal orthogonal system in the band generated by T (A) in B, for each maximal orthogonal system D of A. In this paper we prove that any laterally closed lattice homomorphism T of an Archimedean vector lattice A with universal completion A u into a universally complete vector lattice B can be extended to a lattice homomorphism of A u into B, which is an improvement of a … Show more

“…An -algebra A is called a d-algebra whenever it follows from a ∧ b = 0 and c ≥ 0 that ac ∧ bc = ca ∧ cb = 0 (equivalently, whenever |ab| = |a||b| for all a, b ∈ A). For more informations about this fields, see [4], [13], [14] and [16].…”

Characterization of separating couples

“…An -algebra A is called a d-algebra whenever it follows from a ∧ b = 0 and c ≥ 0 that ac ∧ bc = ca ∧ cb = 0 (equivalently, whenever |ab| = |a||b| for all a, b ∈ A). For more informations about this fields, see [4], [13], [14] and [16].…”

Characterization of separating couples

A remark on the paper “Laterally closed lattice homomorphisms”