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In this paper, we shall prove the strong law of large numbers (SLLN) for set-valued random variables in the sense of dH, and the basic space being Rademacher type p(1lesples2) Banach space. This kind of SLLN is the extension of classical SLLN's for Xi-valued random variables and it also implies previous SLLN's results for set-valued random variables
In this paper, we shall firstly discuss the subtraction of sets, and prove some properties. We also introduce the concepts of set-valued increasing process and finite variation function of set-valued process. Then we define the integral of set-valued random process with respect to finite variation process and discuss its properties. Finally we extend the results to fuzzy set-valued version.
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