Abstract
This paper first introduces the concept of a monotone set-valued measure and then focuses on the atoms and pseudo-atoms of the monotone set-valued measure space. Moreover, the paper proposes an integral, which is the integral of real-valued function with respect to the monotone set-valued measure, and shows some properties of this integral. Particularly, the paper gives the representations of integrals defined on atoms and pseudo-atoms. Some classical results are extended to the case of the monotone set-valued measure.
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