Assume $f: [0,1] \to \mathbb{R}$ is Lebesgue integrable, does it imply that $f$ is bounded almost surly?
2026-04-01 14:20:14.1775053214
Lebesuge integrable function always bounded?
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I don't think so..
Look for example at $\frac1{\sqrt{x(1-x)}}$.