Let for all and .Suppose there exist a function such that for all .

Prove that for each , there exist a set with such that if and , then for all

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- April 3rd 2010, 05:55 AMproblemLebesgue Integral
Let for all and .Suppose there exist a function such that for all .

Prove that for each , there exist a set with such that if and , then for all - April 3rd 2010, 11:52 AMOpalg
Since for all n, it suffices to find a set with such that if and , then for all That is a question that you have raised in this forum previously, and you'll find the answer here.