English

Unbounded Disjointness Preserving Linear Functionals and Operators

Functional Analysis 2016-07-07 v1

Abstract

Let EE and FF be Banach lattices. We show first that the disjointness preserving linear functionals separate the points of any infinite dimensional Banach lattice EE, which shows that in this case the unbounded disjointness operators from EFE\to F separate the points of EE. Then we show that every disjointness preserving operator T:EFT:E\to F is norm bounded on an order dense ideal. In case EE has order continuous norm, this implies that that every unbounded disjointness preserving map T:EFT:E\to F has a unique decomposition T=R+ST=R+S, where RR is a bounded disjointness preserving operator and SS is an unbounded disjointness preserving operator, which is zero on a norm dense ideal. For the case that E=C(X)E=C(X), with XX a compact Hausdorff space, we show that every disjointness preserving operator T:C(X)FT:C(X)\to F is norm bounded on an norm dense sublattice algebra of C(X)C(X), which leads then to a decomposition of TT into a bounded disjointness operator and a finite sum of unbounded disjointness preserving operators, which are zero on order dense ideals.

Keywords

Cite

@article{arxiv.1607.01423,
  title  = {Unbounded Disjointness Preserving Linear Functionals and Operators},
  author = {Anton R Schep},
  journal= {arXiv preprint arXiv:1607.01423},
  year   = {2016}
}
R2 v1 2026-06-22T14:46:27.782Z