DISJOINTNESS-PRESERVING ORTHOGONALLY ADDITIVE OPERATORS IN VECTOR LATTICES

In this article, we investigate disjointness-preserving orthogonally additive operators in the setting of vector lattices. First, we present a formula for the band projection onto the band generated by a single positive, disjointness-preserving, order-bounded, orthogonally additive operator. Then we prove a Radon-Nikodym theorem for a positive, disjointness-preserving, order-bounded, orthogonally additive operator defined on a vector lattice E, taking values in a Dedekind-complete vector lattice F. We conclude by obtaining an analytical representation for a nonlinear lattice homomorphism between order ideals of spaces of measurable almost everywhere finite functions.

Authors
Abasov N. 1 , Pliev M. 2, 3
Number of issue
3
Language
English
Pages
730-750
Status
Published
Volume
12
Year
2018
Organizations
  • 1 Natl Res Univ, MAI, Str Orshanskaya 3, Moscow 121552, Russia
  • 2 Russian Acad Sci, Southern Math Inst, Str Markusa 22, Vladikavkaz 362027, Russia
  • 3 RUDN Univ, 6 Miklukho Maklaya St, Moscow 117198, Russia
Keywords
orthogonally additive operator; Urysohn lattice homomorphism; disjointness-preserving operator; vector lattice; Boolean algebra
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