EDB β€” 1J1

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Exercises

  1. [1J1]Find an example of functions \(f_ n:[0,1]β†’[0,1]\) continuous, bounded, and such that \(f_ n(x)β†˜_ n f(x)\) pointwise to \(f:[0,1]β†’[0,1]\) (i.e. for every \(x\) and \(n\) we have \(0≀ f_{n+1}(x) ≀ f_{n}(x)≀ 1\) and \(\lim _ n f_ n(x) =f(x)\)) but \(f\) is not continuous and the convergence \(f_ nβ†’ f\) is not uniform.

    Solution 1

    [1J2]

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