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math8
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What would be an example (or c/ex)of a closed and bounded but not compact subset C of a complete metric space and why?
What would be an example of a sequence of functions which converges in L^2([0,1]), but which does not converge pointwise almost everywhere?
What would be an example of a sequence of functions which converges in L^2([0,1]), but which does not converge pointwise almost everywhere?