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- Title
ORTHOGONAL ADDITIVITY OF MONOMIALS IN POSITIVE HOMOGENEOUS POLYNOMIALS.
- Authors
Kusraeva, Zalina A.; Tamaeva, Victoria A.
- Abstract
A monomial in finite collection of homogeneous polynomials is a point-wise product of these polynomials each raised to some power. It was established in [14] and [15] that, given a finite set of positive linear operators acting from an Archimedean vector lattice into an f-algebra with multiplicative unit, the corresponding monomial is orthogonally additive polynomial if and only if the collection of these operators is a disjointness preserving set. It is shown in this paper that a similar result is also true in the case when the target space is a uniformly complete vector lattice. Moreover, the result remains valid if we replace the linear operators with homogeneous orthogonally additive polynomials. The correct definition of monomials in homogeneous polynomials is guaranteed by the homogeneous functional calculus and the concavification procedure.
- Subjects
RIESZ spaces; POSITIVE operators; BANACH lattices; LINEAR operators; POLYNOMIALS; CALCULUS; HOMOGENEOUS polynomials
- Publication
Journal of Mathematical Sciences, 2024, Vol 280, Issue 2, p224
- ISSN
1072-3374
- Publication type
Article
- DOI
10.1007/s10958-023-06826-y