Vitali Convergence Theorem for Upper Integrals
نویسنده
چکیده
It is shown that the Vitali convergence theorem remains valid for the -upper integral. Using this result we prove completeness of the space L( ) with respect to the k kp-upper norm for 1 p < 1 , describe convergence of its elements in terms of the space L( ) for 1 p < 1 , give a necessary and sufficient condition for a sequence from L( ) to converge in the k kp-upper norm to a function from L( ) for 1 p < 1 , and deduce some convergence relations concerning the non-measurable objects under consideration.
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تاریخ انتشار 2008