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Let $(X, \Sigma,\mu)$ be a $\sigma$-finite measure space, and let $f:X\to\mathbb R^+$ be a measurable function such that $\mu(\{x\in X\,\colon\,f(x)>t\})>\frac{1}{1+t},\; \forall t>0.$ Prove then that $f$ is not integrable.

I've tried to derive a contradiction, however my original plan to use Chebyshev inequality to get such an absurd turned out to be useless..

Can you help me?

Thanks in advance, Guido

  • 4
    $$ \int_X $f$ d \mu > \sum_{k = 1}^\in$f$ty \fr$a$c{k}{k+1} = \infty$$2012-08-20

2 Answers 2

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$\int_X f d\mu = \int_\mathbb{R_+}\mu(\{x: f(x)>t \})dt > \int_0^\infty \frac{1}{1+t}$

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If $f$ is measurable, then $ \int_X f \, d\mu = \int_0^{+\infty} \mu \left( \left\{ x \in X \mid f(x)>t \right\} \right)\, dt $ See this link.

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    Sorry, +1 to your *answer* :-)2012-08-20