On the representation of order continuous operators by random measures

Weis, L.

doi:10.1090/S0002-9947-1984-0752490-8

On the representation of order continuous operators by random measures
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Trans. Amer. Math. Soc. 285 (1984), 535-563 Request permission

Abstract:

Using the representation $Tf(y) = \smallint f\;d{v_y}$, where $({v_y})$ is a random measure, we characterize some interesting bands in the lattice of all order-continuous operators on a space of measurable functions. For example, an operator $T$ is (lattice-)orthogonal to all integral operators (i.e. all ${v_y}$ are singular) or belongs to the band generated by all Riesz homomorphisms (i.e. all ${v_y}$ are atomic) if and only if $T$ satisfies certain properties which are modeled after the Riesz homomorphism property [31] and continuity with respect to convergence in measure. On the other hand, for operators orthogonal to all Riesz homomorphisms (i.e. all ${v_y}$ are diffuse) we give characterizations analogous to the characterizations of Dunford and Pettis, and Buhvalov for integral operators. The latter results are related to Enflo operators, to a result of J. Bourgain on Dunford-Pettis operators and martingale representations of operators.

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