• PRESERVATION PROPERTIES OF FUZZY RANDOMLY STOPPED SUM IN LAPLACE TRANSFORM ORDER REPRESENTING MEAN RESIDUAL LIFE
Abstract
Some new order preservation properties of stopped sum of independent non-negative fuzzy random variables, when the stopping variable is independent of the summands, is investigated. We show that such fuzzy randomly stopped sums preserve the integral fuzzy harmonic mean residual life orders. For the case of Laplace Transform orders, there is a suitable converse for each of the order preservation results.
Keywords
Some new order preservation properties of stopped sum of independent non-negative fuzzy random variables, when the stopping variable is independent of the summands, is investigated. We show that such fuzzy randomly stopped sums preserve the integral fuzzy
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