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On Sun, 30 Apr 2006 09:58:13 EDT, eugene <jane1806@xxxxxxx> wrote:
>Let (A_n)_n be a sequence of Lebesgue measurable subsets of [0,1], such that
>for any interval (a,b) we have that
>lim_{n->infty} m (A_n & (a;b) ) = (b-a)/3.
>Prove that for any function f: [0,1]->R of bounded variation lim_{n->infty}
>int_{A_n} f(x)dx = int_0^1 f(x)dx.
You left out a 3 in the last equation.
Also I suspect you stated the hypotheses wrong - I don't
see what this has to do with bounded variation.
>Here m is a Lebesgue measure on R and a sign "&" means an interesection.
>
>Any ideas would be very apprecitable
>
>Thanks
************************
David C. Ullrich
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