Characterizations of the projection bands and some order properties of the lattices of continuous functions
Abstract
We show that for an ideal H in an Archimedean vector lattice F the following conditions are equivalent: H is a projection band; Any collection of mutually disjoint vectors in H, which is order bounded in F, is order bounded in H; H is an infinite meet-distributive element of the lattice IF of all ideals in F in the sense that J∈ J(H+ J)=H+ J, for any J⊂ IF. Additionally, we show that if F is uniformly complete and H is a uniformly closed principal ideal, then H is a projection band. In the process we investigate some order properties of lattices of continuous functions on Tychonoff topological spaces.
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