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math105-s22:notes:lecture_15 [2022/03/08 00:30] pzhou |
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====== Lecture 15 ====== | ====== Lecture 15 ====== | ||
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Last time, we considered the (long and hard) Lebesgue density theorem, which says, given any Lebesgue locally integrable function $f: \R^n \to \R$, then for almost all $p$, the density $\delta(p, | Last time, we considered the (long and hard) Lebesgue density theorem, which says, given any Lebesgue locally integrable function $f: \R^n \to \R$, then for almost all $p$, the density $\delta(p, | ||