Atomic Operators in Vector Lattices

Abstract: In this paper, we introduce a new class of operators on vector lattices. We say that a linear or nonlinear operator T from a vector lattice E to a vector lattice F is atomic if there exists a Boolean homomorphism $$\Phi $$ Φ from the Boolean algebra $${\mathfrak {B}}(E)$$ B ( E ) of all order projections on E to $${\mathfrak {B}}(F)$$ B ( F ) such that $$T\pi =\Phi (\pi )T$$ T π = Φ ( π ) T for every order projection $$\pi \in {\mathfrak {B}}(E)$$ π ∈ B ( E ) . We show that the set of all atomic op… Show more

“…The basic constructions of the theory of Nemytskii operators are presented in [26]. Recently, nonlinear superposition operators were investigated in [2,27,28]. Definition 18.…”

Orthogonally Biadditive Operators

“…The basic constructions of the theory of Nemytskii operators are presented in [26]. Recently, nonlinear superposition operators were investigated in [2,27,28]. Definition 18.…”

Orthogonally Biadditive Operators

Orthogonally Additive Operators on Vector Lattices

On Orthogonally Additive Operators in Köthe–Bochner Spaces