UMD Analysis Qualifying Exam/Jan09 Real

Problem 1

(a) Let $f, g$ be real valued measurable functions on $[0, 1]$ with the property that for every $x \in [0, 1]$ , $g$ is differentiable at $x$ and $g^{'} (x) = (f (x))^{2} .$

Prove that $f \in L^{1} [0, 1]$

(b) Suppose in addition that $f$ is bounded on $[0, 1] .$ Prove that

$2 \int_{0}^{1} g (x) f^{2} (x) d x = g^{2} (1) - g^{2} (0) .$

Solution 1

Problem 3

Let $f \in L^{1} (- \infty, \infty)$ and suppose $α > 0$ . Set $f_{n} (x) = \frac{f (n x)}{n^{α}}$ for $n = 1, 2, \dots$ . Prove that for almost every $x \in (- \infty, \infty)$ ,

$\lim_{n \to \infty} f_{n} (x) = 0$

Solution 3

Change of variable

By change of variable (setting u=nx), we have

$\int | f_{n} (x) | d x = \int \frac{| f (u) |}{n^{α + 1}} d u (*)$

Monotone Convergence Theorem

Define $u_{n} (x) = \sum_{i = 1}^{n} | f_{i} (x) |$ .

Then, $u_{n}$ is a nonnegative increasing function converging to $\sum_{i = 1}^{\infty} | f_{i} (x) |$ .

Hence, by Monotone Convergence Theorem and $(*)$

$\begin{matrix} \int \sum_{i = 1}^{\infty} | f_{i} (x) | d x & = \sum_{i = 1}^{\infty} \int | f_{i} (x) | d x \\ = \sum_{i = 1}^{\infty} \int \frac{| f (x) |}{i^{α + 1}} d x \\ = (\int | f (x) | d x) (\sum_{i = 1}^{\infty} \frac{1}{i^{α + 1}}) \\ < \infty \end{matrix}$

where the last inequality follows because the series converges ( $α > 0$ ) and $f \in L^{1}$

Conclusion

Since

$\int \sum_{i = 1}^{\infty} | f_{i} (x) | d x < \infty$ ,

we have almost everywhere

$\sum_{i = 1}^{\infty} | f_{i} (x) | < \infty$

This implies our desired conclusion:

$\lim_{i \to \infty} f_{i} (x) = 0 a.e.$

Problem 5

Solution 5

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UMD Analysis Qualifying Exam/Jan09 Real

Contents

Problem 1

Solution 1

Problem 3

Solution 3

Change of variable

Monotone Convergence Theorem

Conclusion

Problem 5

Solution 5

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UMD Analysis Qualifying Exam/Jan09 Real

Problem 1

Solution 1

Problem 3

Solution 3

Change of variable

Monotone Convergence Theorem

Conclusion

Problem 5

Solution 5

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