用户: Solution/ 习题: 实分析

If you find any typesetting problems feel free to correct it since I am busy.

Also, there are some troublesome questions I left blank, you can complete them if you are interested.

Sets

Problem 1. Given a linear space $X$ , and its linear subspace $V$ , then there is a linear subspace $X$ of $W$ , and $X$ is the direct sum of $V$ and $W$ .

Proof. First we recall Zorn’s Lemma:

Lemma. Let $X$ be a partially ordered non-empty set for which every totally ordered subset has an upper bound. Then $X$ has a maximal element.

Let

Γ

denote the collection of all linear subspaces of

X

, all of which share with

V

only the

0

vector. It is trivial that zero space is in

Γ

, so it is not empty. Define a partial order

≺

as follows:

Y_{1} ≺ Y_{2}

if

Y_{1} \subset Y_{2}

.

Now we verify that any totally ordered subset $Γ^{'}$ of $Γ$ has an upper bound. It suffices to show that $Y^{'} = ⋃_{Y \in Γ^{'}} Y$ is in $Γ$ .

First, it is obvious that $Y^{'} \cap V = \emptyset$ .

Second, verify that $Y^{'}$ is a linear subspace of $X$ . For any $y_{1}, y_{2} \in Y^{'}$ and scalar $k$ , there is $Y_{1}, Y_{2} \in Γ^{'}$ , and $y_{i} \in Y_{i} (i = 1, 2)$ . Since $Γ^{'}$ is totally ordered, we could assume $Y_{1} \subset Y_{2}$ . Then $y_{i} \in Y_{2}$ , so $y_{1} + y_{2}, k y_{1} \in Y_{2} \subset Y^{'}$ , since $Y_{2}$ is a linear subspace of $X$ .

Thus we could use Zorn’s Lemma to get a maximal element

W

of

Γ

. We will show that

X = V \oplus W

. If it is not the case, there exists

x

in

X

,

x

cannot be decomposed as sum of vectors in

V

and

W

. Then let

W^{'}

denote the subspace generated by

x, W

, and

W^{'} \in Γ

, contradicting to the maximality of

W

.

$□$

Problem 2. If $A$ is countable, $f : A \to B$ is surjective, then $B$ is countable.

Proof. Since

f

is surjective, then for any

b \in B

, the pre-image of

b

is non-empty. Choose

g (b) \in f^{- 1} (b)

arbitrarily for all

b \in B

, then

g

is injective. Thus

B, g (B)

are equipotent, but

g (B) \subset A

implies that

g (B)

is countable, then

B

is countable.

$□$

Problem 3. Suppose that $A \subset R$ , for any $x \in A$ , there is $δ > 0$ , such that $(x - δ, x + δ) \cap A$ is countable. Then $A$ is countable.

Proof.

\forall x \in A, \exists a_{x} < x < b_{x} \in Q

, with

(a_{x}, b_{x}) \cap A

countable. Then:

A = x \in A ⋃ ((a_{x}, b_{x}) \cap A) \subset a < b \in Q, (a, b) \cap A countable ⋃ (a, b) \cap A

is countable since it is a subset of a countable union of countable sets.

$□$

Problem 4. Construct a bijection from $R^{2}$ to $R$ .

Proof. The readers are invited to surf the internet for answers.(Or can someone complete this?)

Hint: Consider the numbers in $[0, 1)$ , and write them in decimals. Assume that we write the finite decimals NOT in the form of $0. XXX ... XXX 999...$ , but $0. XXX ... XXX 000...$

Then we can "split" a number into two in the following way:

Example: $0.23989479837099981...$

Write a bar after each number other than $9$ : $0.2∣3∣98∣94∣7∣98∣3∣7∣0∣9998∣1∣...$

We have infinite many bars since there is no $0. XXX ... XXX 999...$

Then we get two numbers:

0.2∣98∣7∣3∣0∣1∣...

and

0.3∣94∣98∣7∣9998∣...

. We can prove that this gives a bijection between

[0, 1)

and

[0, 1) \times [0, 1)

by writing its inverse (which is obvious).

$□$

Measure Space

Problem 5. Given a measure space $(X, X)$ , and an arbitrary function $f : X \to R$ . We have $A = {A \subset R : f^{- 1} (A) \in X}$ is a $σ$ -algebra.

Proof. By definition, we will check the following conditions:

1.

$\emptyset, R \in A$ :

$f^{- 1} (\emptyset) = \emptyset \in X, f^{- 1} (R) = X \in X .$

2.

if $A \in A$ , then $A^{c} \in A$ :

$f^{- 1} (A^{c}) = (f^{- 1} (A))^{c} \in X .$

3.

if ${A_{n}}_{n = 1}^{\infty}$ is a sequence in $A$ , then $⋃_{n = 1}^{\infty} A_{n} \in A$ :

$f^{- 1} (⋃_{n = 1}^{\infty} A_{n}) = ⋃_{n = 1}^{\infty} f^{- 1} (A_{n}) \in X .$

$□$

Problem 6. Determine if it is true and give a proof: The collection of irrationals in $[0, 1]$ , the decimal expansion of which contain no digit “ $7$ ”, is Borel.

Proof. The following discussion is within $[0, 1]$ and using decimal expansion. Let $A$ denote those numbers whose expansion contain digit “ $7$ ”, then it suffices to check $A$ is Borel. (Why?)

Let

B_{n}

denote numbers with the

n

-th position of expansion “

7

”, then

B_{n}

could be decomposed of countable disjoint intervals, thus it is Borel. Since

A = ⋃ B_{n}

,

A

is also Borel.

$□$

Problem 7. The $σ$ -algebra generated by intervals of the form $(- \infty, a)$ is exactly $B (R)$ .

Proof. With the closure of complement and countable union operations in

σ

-algebra, it is not hard to construct all open intervals, then the

B (R)

.

$□$

Problem 8. Determine if it is true and give a proof: Let $C$ denote the $σ$ -algebra of the collection of all subsets of $R$ , then the following set functions are measures on $(R, C)$ : $μ_{1} (A) = {0, \infty, if A is finite if A is infinite., μ_{2} (A) = {0, \infty, if A is countable if A is uncountable.$

Proof. Since $μ_{1} (Z) = \infty \neq = 0 = \sum_{n \in Z} μ_{1} ({n})$ , we know $μ_{1}$ is not a measure.

It is trivial to check by definition that

μ_{2}

is a measure.

$□$

Problem 9. Let $C$ denote the collection of subsets of $N$ that make this limit exist: $n \to \infty lim \frac{∣ A \cap { 1 , \dots , n } ∣}{n}$

And in case it exists, let $p (A)$ denote it. Determine if $(N, C, p)$ is a measure space.

Proof. In fact, the countable additivity is not satisfied.

First we construct a set $A \in N$ , and the limit does not exist: $A = {j \in N, \exists n \in Z_{+}, 2^{n} \leq j < 3 \times 2^{n - 1}}$

Then denote $A_{n} = ∣ A \cap {1, \dots, n} ∣$ , it is easy to observe: $A_{3 \times 2^{n - 1}} = k = 1 \sum n 2^{k - 1} = 2^{n} - 1, A_{2^{n} - 1} = 2^{n - 1} - 1 n \to \infty lim \frac{A _{3 \times 2^{n - 1}}}{3 \times 2 ^{n - 1}} = \frac{2}{3}, n \to \infty lim \frac{A _{2^{n} - 1}}{2 ^{n} - 1} = \frac{1}{2}$

Which implies what we want. Then we seperate

A

into countable disjoint union of unit subsets. Each of them are in

C

, but

A

is not. A contradiction!

$□$

Problem 10. Assume $(X, X, μ)$ to be a measure space, for any $E_{1}, E_{2} \in X$ , we have $μ (E_{1} \cup E_{2}) + μ (E_{1} \cap E_{2}) = μ (E_{1}) + μ (E_{2}) .$

Proof. If the right hand side is infinity, then it is trivial.

Otherwise, due to countable additivity, we obtain $μ (E_{1} \cup E_{2}) = μ (E_{1} \cap E_{2}) + μ (E_{1} - E_{2}) + μ (E_{2} - E_{1}) μ (E_{1}) = μ (E_{1} \cap E_{2}) + μ (E_{1} - E_{2}) μ (E_{2}) = μ (E_{1} \cap E_{2}) + μ (E_{2} - E_{1})$

Which implies what we want.

$□$

Problem 11. Let $E_{1}, E_{2}, \dots, E_{n}$ be Borel subsets of $[0, 1], \sum_{k = 1}^{n} m (E_{k}) > n - 1$ , then $⋂_{k = 1}^{n} E_{k}$ is not empty.

Proof. Let $F_{k} = [0, 1] \ E_{k}$ , then $⋂_{k = 1}^{n} E_{k} = [0, 1] \ ⋃_{k = 1}^{n} F_{k}$ , which implies: $m (k = 1 ⋂ n E_{k}) = 1 - m (k = 1 ⋃ n F_{k}) \geq 1 - k = 1 \sum n m (F_{k}) = 1 - k = 1 \sum n (1 - m (E_{k})) > 0$

and it is obvious that

⋂_{k = 1}^{n} E_{k}

is not empty.

$□$

Problem 12. (Poincaré Recurrence Theorem) Let $(X, X, μ)$ be a probability space (a measure space with $μ (X) = 1$ ), $f : X \to X$ is a measure-preserving transformation, which means: for any $E$ measurable, $f^{- 1} (E)$ is also measurable, and their measure coincide. Then for any set $A$ of positive measure, there exists $x \in A, n \in N_{+}$ , with $f^{\circ n} (x) \in A$ .

Proof. We prove it by contradiction. If $m (A) > 0$ , but $\forall x \in A, n \in N_{+}, f^{\circ n} (x) \in / A$ , then $f^{\circ n} (A) \cap A = \emptyset$ , and we can easily prove by contradiction $f^{\circ (- n)} (A) \cap A = \emptyset$ . Then again, $A, f^{- 1} (A), \dots, f^{\circ (- n)} (A), \dots$ are disjoint. Finally we obtain $μ (n = 1 ⋃ \infty f^{\circ (- n)} (A)) = n = 1 \sum \infty μ (f^{\circ (- n)} (A)) = n = 1 \sum \infty μ (A) = \infty$

Contradicting to

μ (X) = 1

!

$□$

Problem 13. $\forall E \subset R, m^{*} (E) = in f {m^{*} (U), U open, E \subset U}$

Proof. For any $ε > 0$ , let ${I_{k}}$ be a countable open cover of $E$ , $E \subset ⋃ I_{k}, \sum m (I_{k}) \leq m^{*} (E) + ε$ .

Since $U = ⋃ I_{k}$ is open, and $E \subset U$ , we get: $m^{*} (U) \leq \sum m^{*} (I_{k}) = \sum m (I_{k}) \leq m^{*} (E) + ε .$

Using the definition of infimum, we are done.

$□$

Problem 14. If $E, F \subset R$ with $m^{*} (E △ F) = 0$ , where $E △ F = (E \ F) \cup (F \ E)$ . $E$ is Lebesgue measurable if and only if $F$ is Lebesgue measurable.

Proof. Due to the symmetry between $E, F$ , we only deal with the case where $E$ is measurable. Then for any $T \subset R$ , we have: $m^{*} (T) = m^{*} (T \cap E) + m^{*} (T \cap E^{c}) .$ To prove $F$ is measurable, it suffices to show: $m^{*} (T) \geq m^{*} (T \cap F) + m^{*} (T \cap F^{c}) .$

Then we observe and make use of the assumption: $T \cap F \subset (T \cap E) \cup (E △ F), m^{*} (T \cap F) \leq m^{*} (T \cap E)$ $T \cap F^{c} \subset (T \cap E^{c}) \cup (E △ F), m^{*} (T \cap F^{c}) \leq m^{*} (T \cap E^{c})$

Which implies what we want.

$□$

Problem 15. $\forall A, B \subset R, m^{*} (A \cup B) + m^{*} (A \cap B) \leq m^{*} (A) + m^{*} (B) .$

Proof. Using 13, we have $\forall ε > 0, \exists U, V$ open, with: $A \subset U, B \subset V, m^{*} (U) + m^{*} (V) < m^{*} (A) + m^{*} (B) + ε .$

Since 10 holds for $U, V$ , we obtain $= m^{*} (A \cap B) + m^{*} (A \cup B) \leq m^{*} (U \cap V) + m^{*} (U \cup V) m^{*} (U) + m^{*} (V) < m^{*} (A) + m^{*} (B) + ε .$

Then we are done since

ε

is arbitrary.

$□$

Problem 16. Let $d (A, B) > 0$ , then $m^{*} (A \cup B) = m^{*} (A) + m^{*} (B)$ .

Proof. If the right hand side is infinity, then it is trivial.

Otherwise, for any $ε > 0$ , let ${I_{k}}$ be a countable open cover of $A \cup B$ , $\sum m (I_{k}) \leq m^{*} (A \cup B) + ε$ .

Since $d (A, B) > 0$ , we assume $m (I_{k}) < d (A, B)$ , then ${I_{k}}$ cound be divided into two groups: ${I_{1 k}}$ covering $A$ and ${I_{2 k}}$ covering $B$ . So we have $m^{*} (A) + m^{*} (B) \leq \sum m (I_{1 k}) + \sum m (I_{2 k}) = \sum m (I_{k}) \leq m^{*} (A \cup B) + ε .$

Then we are done since

ε

was arbitrary.

$□$

Problem 17. Assume $m^{*} (E) < \infty$ , and for any reals $a < b$ , $b - a = m^{*} ((a, b) \cap E) + m^{*} ((a, b) \ E) .$

Then $E$ satisfies Caratheodory condition.

Proof. $\forall T \subset R$ , our goal is to prove $m^{*} (T) \geq m^{*} (T \cap E) + m^{*} (T \cap E^{c})$ .

For any $ε > 0$ , let ${I_{k}}$ be a countable set of open intervals covering $T$ , $T \subset ⋃ I_{k}, \sum m (I_{k}) \leq m^{*} (T) + ε$ .

We obtain: $T \cap E \subset ⋃ (I_{k} \cap E), T \cap E^{c} \subset ⋃ (I_{k} \cap E^{c}) m^{*} (T \cap E) + m^{*} (T \cap E^{c}) \leq \sum (m^{*} (I_{k} \cap E) + m^{*} (I_{k} \cap E^{c})) = \sum m^{*} (I_{k}) < m^{*} (T) + ε .$

Since

ε

was arbitrary, we are done.

$□$

Construct the following:

Problem 18. $A \subset R$ with $0 < 4 m (A^{\circ}) = 2 m (A) = m (\overset{ˉ}{A}) < \infty$ .

Proof. Observing the properties of rational numbers, we define $A_{1} = (0, 2) \cap Q, A_{2} = (2, 3) \ Q, A_{3} = (3, 4), A_{1}^{\circ} = \emptyset, A_{2}^{\circ} = \emptyset, A_{3}^{\circ} = (3, 4), \overset{ˉ}{A_{1}} = [0, 2] \overset{ˉ}{A_{2}} = [2, 3] \overset{ˉ}{A_{3}} = [3, 4]$

Then it is easy to check

A_{1} \cup A_{2} \cup A_{3}

is what we want.

$□$

Problem 19. Construct a sequence of disjoint subsets of $R$ , such that the measure of the closure of their union is greater than the sum of the measure of their closure.

Proof. Let

{r_{n}}

denote the sequence of all rational numbers. Then

A_{n} = {r_{n}}

is a unit set. We have:

m (\overline{n = 1 ⋃ \infty A_{n}}) = \infty > 0 = n = 1 \sum \infty m (\overline{A_{n}}) .

$□$

Measurable Functions

Problem 20. Given a measure space $(X, X)$ , then $f : X \to R$ is $X$ -measurable if and only if for any integer $k, n$ , we have: ${x : f (x) > \frac{k}{2 ^{n}}} \in X$

Proof. For any

c \in R

, let a sequence of the form

k / 2^{n}

approximate it.

$□$

Problem 21. Given a measure space $(X, X)$ , and a sequence of measuable functions $f_{n} : X \to R$ .Denote $E = {x \in X : {f_{n} (x)} converges in R} .$

Then $E$ is measurable.

Proof. In fact,

lim sup f_{n} (x), lim inf f_{n} (x)

are measurable. We have

E = {x \in X : lim sup f_{n} (x) = lim inf f_{n} (x)}

is also measurable.

$□$

Problem 22. Let $f : R \to R$ be pointwise differentiable, $E \subset R, m (E) = 0$ . Then $m (f (E)) = 0$ .

Proof. We set $E_{n} = {x \in E : ∣ f^{'} (x) ∣ < n}$ , then $f (E_{n})$ increases to $f (E)$ . Since $m (E) = 0$ , for any $ε > 0$ , there exists an open set $U$ such that $E \subset U$ and $m (U) < ε / n$ .

For each $x \in E_{n}$ , there exsits a binary interval $J_{x}$ such that $x \in J_{x} \subset U$ and $m (f (J_{x})) < nm (J_{x})$ .

Then $J = {J_{x}, x \in E_{n}}$ is a cover of $E_{n}$ . By removing the duplicate parts we obtain $J_{1} \subset J$ , a disjoint cover of $E_{n}$ . We have the estimate $m (f (E_{n})) \leq \sum m (f (J_{x})) \leq n \sum m (J_{x}) = nm (⋃ J_{x}) \leq nm (U) < ε$

Thus $m (f (E_{n})) = 0$ since $ε$ was arbitrary. And finally $m (f (E)) = m (lim f (E_{n})) = lim m (f (E_{n})) = 0.$

$□$

Problem 23. Let $f : R^{2} \to R$ be a continuous function. For any $x \in R$ , let $p (x)$ denote the number of y that satisfies $f (x, y) = 0$ . Then $p (x)$ is Borel measurable.

Proof. Since $p (x)$ is a positive integer-valued function, it suffices to prove ${x : p (x) \geq n}$ is borel for any positive integer $n$ . Observe that ${x : p (x) \geq n} = {x : \exists distinct y_{1}, \dots, y_{n}, f (x, y_{k}) = 0} = {x : \exists N, m \in N_{+}, \exists distinct y_{1}, \dots, y_{n}, ∣ y_{k} ∣ \leq N, ∣ y_{j} - y_{k} ∣ \geq \frac{1}{m}, f (x, y_{k}) = 0} = N = 1 ⋃ \infty m = 1 ⋃ \infty E_{n}$

Where we denote $E_{n} = {x : \exists distinct y_{1}, \dots, y_{n}, ∣ y_{k} ∣ \leq N, ∣ y_{j} - y_{k} ∣ \geq \frac{1}{m}, f (x, y_{k}) = 0}$

Thus our problem is reduced to prove $E_{n}$ is closed. If so, it is Borel, then countable union of Borel sets is still Borel.

$\forall x_{0} \in E_{n}^{'}, \exists {x_{r}} \subset E_{n}, lim x_{r} = x_{0}$ . since $x_{r} \in E_{n}$ , $\exists y_{r 1}, \dots, y_{r n} pairwise disjoint, ∣ y_{r k} ∣ \leq N, ∣ y_{r j} - y_{r k} ∣ \geq \frac{1}{m}, f (x_{r}, y_{r k}) = 0.$

Then for any $r, k$ , $y_{r k}$ is bounded by $N$ . Thus ${(y_{r 1}, \dots, y_{r n})} \subset R^{n}$ is also bounded, and contains a subsequence ${(y_{r_{t} 1}, \dots, y_{r_{t} n})}$ which converges to $(y_{01}, \dots, y_{0 n})$ . Still we have $∣ y_{0 k} ∣ \leq N, ∣ y_{0 j} - y_{0 k} ∣ \geq \frac{1}{m}$ , and since $f$ is continuous, we obtain $f (x_{0}, y_{0 k}) = f (lim (x_{r_{t}}, y_{r_{t} k})) = lim f (x_{r_{t}}, y_{r_{t} k}) = 0.$

Finally

x_{0}

is in

E_{n}

. Thus

E_{n}

is closed.

$□$

Problem 24. Let $μ$ be a Borel measure on $R$ . Then real-valued function $f (x) = r \to 0 lim inf \frac{μ (( x - r , x + r ))}{r}$

is Borel measuable.

Proof. Since $f (x) = lim_{r_{0} \to 0^{+}} f_{r_{0}} (x)$ , where we denote $f_{r_{0}} (x) = 0 < r < r_{0} in f \frac{μ (( x - r , x + r ))}{r} .$

It is obvious that for a fixed $x$ , the function $f_{r_{0}} (x)$ of $r_{0}$ is decreasing. Thus we obtain $f (x) = sup f_{1/ n} (x)$ . Next we shall prove this $f_{1/ n} (x)$ is Borel measurable, then the supremum of it is still Borel measurable.

We claim that for any $n \in N_{+}, c \in R$ , the set ${f_{1/ n} (x) < c}$ is open.

For any $x_{0} \in {f_{1/ n} (x) < c}$ , we have ${f_{1/ n} (x_{0}) < c}$ . Using definition, there exists $0 < r < 1/ n$ , such that $μ ((x_{0} - r, x_{0} + r)) < cr$ . Thus take one more $0 < s ≪ r$ , such that $μ ((x_{0} - r, x_{0} + r)) < c (r - s)$ .

For any

x \in U (x_{0}, s)

, we have

U (x, r - s) \subset U (x_{0}, r)

. Then

μ ((x - (r - s), x + (r - s))) \leq μ ((x_{0} - r, x_{0} + r)) < c (r - s)

0 < r < \frac{1}{n} in f \frac{μ (( x - r , x + r ))}{r} \leq \frac{μ (( x - ( r - s ) , x + ( r - s )))}{r - s} < c

Thus

f_{1/ n} (x) < c

, namely

U (x_{0}, s) \subset {f_{1/ n} (x) < c}

, so it is open, then Borel measurable.

$□$

Lebesgue Integral

Problem 25. Let $(X, X, μ)$ be a measure space with $μ (X) < \infty$ . $f : X \to R$ is integrable if and only if: $n = 1 \sum \infty 2^{n} μ ({x \in X : ∣ f (x) ∣ > 2^{n}}) < \infty.$

Proof. Let $A_{n} = {x \in X : 2^{n} < ∣ f (x) ∣ \leq 2^{n + 1}}$ , then we denote: $B_{n} = m = n ⋃ \infty A_{m}$

this union is disjoint.Thus $I = n = 1 \sum \infty 2^{n} μ (B_{n}) = n = 1 \sum \infty 2^{n} m = n \sum \infty μ (A_{m}) = m = 1 \sum \infty μ (A_{m}) n = 1 \sum m 2^{n} = m = 1 \sum \infty \int (2^{m + 1} - 1) χ_{A_{m}} d μ = \int m = 1 \sum \infty (2^{m + 1} - 1) χ_{A_{m}} d μ \int ∣ f (x) ∣ - 1 d μ \leq I < \int 2∣ f (x) ∣ - 1 d μ$

Since

μ (X) < \infty

and

∣ f ∣

is integrable if and only if

f

is integrable, we are done.

$□$

Problem 26. Suppose ${f_{n}}_{1}^{\infty} \subset L^{+}, f_{n} \to f$ pointwise, and $\int f = lim \int f_{n} < \infty$ . Then $\int_{E} f = lim \int_{E} f_{n}$ $\forall E \in M$ . However, this need not be true if $\int f = lim f_{n} = \infty$ .

Proof. *:Applying Fatou Lemma to the complement of $E$ .

Let

E \in M

and

\int f < \infty

, we have:

\int f = \int (χ_{E} f + χ_{E^{c}} f) = \int χ_{E} f + \int χ_{E^{c}} f

And similarly for substituting

f_{n}

for

f

above. Now, since

f_{n} \to f \Rightarrow χ_{F} f_{n} \to χ_{F} f, \forall F \in M

, we may apply Fatou’s Lemma as follows:

\int_{E} f = \int n \to \infty lim inf χ_{E} f_{n} \leq n \to \infty lim inf \int_{E} f_{n} = * n \to \infty lim inf (\int f_{n} - \int_{E^{c}} f_{n}) = ** \int f - n \to \infty lim sup \int_{E^{c}} f_{n}

Where we have

= *

since

\int_{E} f = \int χ_{E} f + \int χ_{E^{c}} f

, and

= **

since

lim inf \int f_{n} = lim \int f_{n} = \int f

and

lim inf - \int g = - lim sup \int g

. However, since all terms above are finite, we may gain by apply Fatou’s Lemma (and in noticing the similarity to the steps made above) to see that:

n \to \infty lim sup \int_{E^{c}} f_{n} = n \to \infty lim sup (\int f_{n} - \int_{E} f_{n}) = \int f - n \to \infty lim inf \int_{E} f_{n} \leq \int f - \int_{E} f .

And thus by substituting this in, we have:

\int_{E} f \leq n \to \infty lim inf \int_{E} f_{n} \leq n \to \infty lim sup \int_{E} f_{n} \leq \int_{E} f .

And therefore all the inequalities in the equation(s) above are actually equalities, and so we have:

n \to \infty lim inf \int_{E} f_{n} = n \to \infty lim sup \int_{E} f_{n} = n \to \infty lim \int_{E} f = \int_{E} f .

We now turn our attention showing the above result need not hold if

\int f = lim \int f = \infty

by means of a counter-example. Let

E = (0, 1], f = χ_{[2, \infty)}

, and

f_{n} = χ_{[2, \infty)} + n χ_{(0, 1/ n]}

. Then

f_{n} \to f

p.w., and:

\int_{(0, 1]} f_{n} = n μ ((0, 1/ n]) = 1\forall n \in N \Rightarrow n \to \infty lim \int_{(0, 1]} f_{n} = 1.

However,

\int_{(0, 1]} f = 0

, thus

\int_{E} f = lim \int_{E} f_{n}

need not be true if

lim \int f_{n} = \int f = \infty

.

$□$

Problem 27. Suppose that ${f_{j}}$ is a sequence in $L^{1}$ such that $\sum_{1}^{\infty} \int_{j} ∣ f_{j} ∣ < \infty$ . Then $\sum_{1}^{\infty} f_{j}$ converges a.e. to a function in $L^{1}$ , and $\int \sum_{1}^{\infty} f_{j} = \sum_{1}^{\infty} \int f_{j}$ .

Proof.

\int \sum_{1}^{\infty} ∣ f_{j} ∣ = \sum_{1}^{\infty} \int ∣ f_{j} ∣ < \infty

, so the function

g =

\sum_{1}^{\infty} ∣ f_{j} ∣

is in

L^{1}

. In particular,

\sum_{1}^{\infty} ∣ f_{j} (x) ∣

is finite for a.e.

x

, and for each such

x

the series

\sum_{1}^{\infty} f_{j} (x)

converges. Moreover,

∣ \sum_{1}^{n} f_{j} ∣ \leq g

for all

n

, so we can apply the dominated convergence theorem to the sequence of partial sums to obtain

\int \sum_{1}^{\infty} f_{j} = \sum_{1}^{\infty} \int f_{j}

.

$□$

Problem 28. Let $f$ be a non-negative measurable function, ${E_{k}}_{k = 1}^{\infty}$ is a sequence of measurable sets, such that $k \to \infty lim μ (X \ E_{k}) = 0.$

Then $lim \int_{E_{k}} f d μ = \int f d μ .$

Proof.

Hint: Let

A n

denote the

x

that

f (x) > n

. Use theories of summation of series to solve the problem when the equality given takes real values.

$□$

Problem 29. Let $f$ be a positive-valued measurable function. For any $α > 0$ , $in f {\int_{E} f d μ : μ (E) \geq α} > 0.$

Proof. We prove it by contradiction. If there exists $α > 0$ , such that $in f {\int_{E} f d μ : μ (E) \geq α} = 0,$

then we can choose a sequence ${E_{k}}_{k = 1}^{\infty}$ , each with $μ (E_{k}) \geq α$ , and $\int_{E_{k}} f d μ \leq 1/ 2^{k}$ .

Let $F = lim sup E_{k}$ , it is not hard to observe $μ (F) = lim μ (k = n ⋃ \infty E_{k}) \geq α$ $\int_{F} f d μ \leq \int_{⋃_{k = n}^{\infty} E_{k}} f d μ \leq k = n \sum \infty \int_{E_{k}} f d μ \leq k = n \sum \infty \frac{1}{2 ^{k}} = \frac{1}{2 ^{n - 1}}$

Let

n \to \infty

, we obtain

\int_{F} f d μ = 0

, then

f = 0

holds a.e. on

F

, contradicting to being positive-valued.

$□$

Problem 30. Let $f$ be a non-negative measurable function, and there is a constant $c$ , such that $\int f^{n} d μ = c$ holds for any $n \in N^{+}$ . Then there exists a measurable set $E$ , $f (x) = χ_{E} (x)$ a.e.

Proof. First we compute $F (x) = lim inf f (x)^{n}$ . For $f (x) < 1, = 1, > 1$ , $F (x) = 0, 1, \infty$ respectively.

By Fatou’s Lemma, $\int F \leq lim inf \int f^{n} = lim inf \int f = c$

We obtain for a.e. $F < \infty \Rightarrow f \leq 1 \Rightarrow f^{2} \leq f$ . But on the other hand we have $\int f^{2} = \int f$ , then for a.e. $f^{2} = f \Rightarrow f = 0 or f = 1$ .

Thus let

E = {f (x) = 1}

, it is exactly what we want.

$□$

Problem 31. For any $x \in [0, 1)$ , define by its binary decomposition a sequence of functions $x = 0. a_{1} (x) a_{2} (x) \dots$ . For those without an unique decomposition, we choose the one with the ending of $000 \dots$ .

Let $f : [0, 1) \to R$ be Lebesgue measurable, then $n \to \infty lim \int_{0}^{1} f (x) a_{n} (x) d x = \frac{1}{2} \int_{0}^{1} f (x) d x .$

Proof.

1.	If $f$ is continuous on $[0, 1]$ , then it is also uniformly continuous. For any $ε > 0$ , there exists $N > 0$ , such that $∣ f (x) - f (y) ∣ \leq ε$ for any $∣ x - y ∣ < 1/ 2^{N + 1}$ . Thus for any $n > N$ , we have $∣ ∣ \int_{\frac{k}{2 ^{n}}}^{\frac{k + \frac{1}{2}}{2 ^{n}}} f (x) d x - \int_{\frac{k + \frac{1}{2}}{2 ^{n}}}^{\frac{k + 1}{2 ^{n}}} f (x) d x ∣ ∣ \leq \int_{\frac{k}{2 ^{n}}}^{\frac{k + \frac{1}{2}}{2 ^{n}}} ε d x = \frac{ε}{2 ^{n + 1}}$ $∣ ∣ \int_{0}^{1} f (x) a_{n} (x) d x - \int_{0}^{1} f (x) (1 - a_{n} (x)) d x ∣ ∣ \leq 2^{n} \frac{ε}{2 ^{n + 1}} = \frac{ε}{2}$ Which implies the limit. Now we approximate any measurable function by a continuous one.
2.	If $f$ is a indicator function: $f = χ_{E}$ , $E \subset [0, 1)$ , by Lusin’s theorem, for each $δ > 0$ there exists a continuous $h : R \to [0, 1]$ such that $m ({f \neq = h}) < δ$ , thus $\int_{0}^{1} ∣ f - h ∣ d x \leq δ$ . We already know $\int_{0}^{1} h a_{n} d x \to \frac{1}{2} \int_{0}^{1} h d x$ , and we have $∣ ∣ \int_{0}^{1} f a_{n} d x - \int_{0}^{1} h a_{n} d x ∣ ∣ \leq \int_{0}^{1} ∣ f - h ∣ d x \leq δ$ Since $δ$ was arbitrary, we are done.
3.	If $f$ is a simple function, it is trivial by the above.
4.	Finally for any measurable $f$ , WLOG we assume $f \geq 0$ . Let an increasing sequence of simple functions approximate it and...

$□$

Problem 32. Let $μ (X) < \infty, f : X \to [0, \infty)$ be bounded. Then $\int f d μ = in f {\int φ d μ : φ \geq f, φ simple}$ Moreover, prove by examples that the condition $μ (X) < \infty$ is necessary.

Proof. Let $∣ f ∣ < M$ . We obtain by $μ (X) < \infty$ the following: $M μ (X) - \int f d μ = \int M - f d μ = sup {\int ψ d μ, ψ simple, 0 \leq ψ \leq M - f}$ $= sup {\int M - φ d μ, φ simple, f \leq φ \leq M} = M μ (X) - inf {\int φ d μ, φ simple, φ \geq f}$

Which implies what we want.

For an example, let $μ$ be a counting measure on $(N, 2^{N}, μ)$ and $f : N \to [0, \infty)$ be $f (n) = 1/ n^{2}$ , then it is bounded, and we have $\int f d μ = sup {\int φ d μ, φ simple \leq f} = 1 \sum \infty \frac{1}{n ^{2}} = \frac{π ^{2}}{6} .$

But for any simple

φ \geq f

, assume

φ = \sum_{k = 1}^{n} a_{k} χ_{E_{k}}

, then each

a_{k} > 0

, and

⨆_{k = 1}^{n} E_{k} = N

. Thus there exists a

E_{k}

, which is infinite, so

\int φ d μ = \infty

:

in f {\int φ d μ : φ \geq f, φ simple} = \infty.

$□$

Problem 33. Let $f$ be integrable. For any $ε > 0$ , there exists $E$ measurable, $μ (E) < \infty$ , such that $∣ ∣ \int f d μ - \int_{E} f d μ ∣ ∣ < ε$

Proof. WLOG we assume $f \geq 0$ . Let $F_{n} = {f > \frac{1}{n}}$ and $F = {f > 0}$ , then $F_{n}$ increases to $F$ , $χ_{F_{n}}$ increases to $χ_{F}$ . By MCT we have $\int f = \int χ_{F} f = lim \int χ_{F_{n}} f = lim \int_{F_{n}} f .$

Now it suffices to check

μ (F_{n}) < \infty

. It is guaranteed by

μ (F_{n}) = \int_{F_{n}} 1 < \int_{F_{n}} n f < n \int f < \infty.

$□$

Problem 34. Let ${f_{n}}_{n = 1}^{\infty}$ be a sequence of integrable functions that converge to $0$ a.e. Constant $M > 0$ such that $\int max {∣ f_{1} (x) ∣, ∣ f_{2} (x) ∣, \dots, ∣ f_{n} (x) ∣} d μ < M$

for any positive integer $n$ . Then $n \to \infty lim \int f_{n} d μ = 0.$

Proof. Let $g_{n} (x) = max {∣ f_{1} (x) ∣, \dots, ∣ f_{n} (x) ∣}$ be a monotone increasing sequence of positive measurable functions and let $g = lim g_{n}$ , we obtain by MCT: $n \to \infty lim \int g_{n} d μ = \int g d μ$

Since $\int g_{n} d μ < M$ , $\int g d μ \leq M$ . Thus $g$ is integrable.

On the other hand,

∣ f_{n} ∣ \leq g_{n} \leq g

, then by DCT and

f_{n} \to 0

a.e.:

n \to \infty lim \int f_{n} d μ = \int 0 d μ = 0.

$□$

Problem 35. Compute $n \to \infty lim \int_{0}^{\infty} (1 + \frac{x}{n})^{n} e^{- 2 x} d x .$

Proof. 1.

$□$

Problem 36. Let $f : X \to R$ be measurable, $μ (X) < \infty$ . Then $n \to \infty lim \int ∣ cos (π f (x)) ∣^{n} d μ = μ (f^{- 1} (Z)) .$

Proof. Let $g_{n} (x) = ∣ cos (π f (x)) ∣^{n}, \tilde{X} = f^{- 1} (Z)$ , then $\tilde{X}$ is measurable since $f$ is measurable.

For $x \in \tilde{X}$ , $g_{n} (x) = 1$ . Otherwise, $g_{n} (x) \to 0$ . Thus $g_{n} (x) ↘ χ_{\tilde{X}}$ .

By MCT and

μ (X) < \infty

, we obtain

n \to \infty lim \int g_{n} d μ = \int χ_{\tilde{X}} d μ = μ (\tilde{X}) .

$□$

Problem 37. Compute $n \to \infty lim \int_{0}^{n^{2}} \frac{x ^{\frac{1}{n}}}{1 + x ^{2 n}} d x$

Proof. 1.

$□$

Problem 38. Let $f_{n}$ be measurable. For any $x \in X$ , $∣ f_{n} (x) ∣ < 1/ n^{2}$ , for any positive integer $n$ . Let $g$ be integrable. Then for any $E$ measurable, the following holds: $\int_{E} \sum f_{n} g d μ = \sum \int_{E} f_{n} g d μ .$

Proof. WLOG we assume $f_{n}, g \geq 0$ , then prove it by lemmas:

Lemma. Let $f_{n} \geq 0$ be measurable, $f_{n} \to f$ pointwise, $\int f = lim \int f_{n} < \infty$ , then for any $E$ measurable, we have $\int_{E} f = lim \int_{E} f_{n} .$

Lemma. Let $f_{n} \geq 0$ be measurable, $f = \sum f_{n}$ , then $\int f = \sum \int f_{n}$ .

Back to our proof, we check two things at first: $\sum_{k = 1}^{n} f_{k} g \to \sum_{k = 1}^{\infty} f_{k} g$ , which is obvious; second: $\int k = 1 \sum n f_{k} g \to \int k = 1 \sum \infty f_{k} g < \infty$

This convergence is by the second lemma, and finity by $f_{n} < 1/ n^{2}$ .

By the first lemma, for any $E$ measurable, we have $\int_{E} k = 1 \sum \infty f_{k} g = lim \int_{E} k = 1 \sum n f_{k} g = lim k = 1 \sum n \int_{E} f_{k} g,$

where the latter equality is by the second lemma.

$□$

Problem 39. Let $f : [0, 1) \to R$ be Lebesgue measurable. For each $n \in N_{+}$ , define $f_{n} (x) = n \int_{\frac{k}{n}}^{\frac{k + 1}{n}} f (t) d t, x \in [\frac{k}{n}, \frac{k + 1}{n}), k = 0, 1, \dots, n - 1.$

Then $n \to \infty lim \int_{0}^{1} ∣ f_{n} (x) - f (x) ∣ d x = 0.$

Proof.

1.	If $f$ is continuous on $[0, 1]$ , then it is also uniformly continuous. For any $ε > 0$ , there exists $N > 0$ , such that $∣ f (x) - f (y) ∣ \leq ε$ for any $∣ x - y ∣ < 1/ N$ . Thus for any $n > N$ , we have $\int_{\frac{k}{n}}^{\frac{k + 1}{n}} ∣ f_{n} (x) - f (x) ∣ d x \leq n \int_{\frac{k}{n}}^{\frac{k + 1}{n}} \int_{\frac{k}{n}}^{\frac{k + 1}{n}} ∣ f (t) - f (x) ∣ d t d x \leq n \int_{\frac{k}{n}}^{\frac{k + 1}{n}} ε \frac{1}{n} d x = \frac{ε}{n} .$ Add them, by the arbitrary of $ε$ , we obtain the limit. Now we approximate any measurable function by a continuous one.
2.	If $f$ is a indicator function: $f = χ_{E}$ , $E \subset [0, 1)$ , by Lusin’s theorem, for each $δ > 0$ there exists a continuous $h : R \to R$ such that $m ({f \neq = h}) < δ$ , thus $\int_{0}^{1} ∣ f - h ∣ d x \leq δ$ . We already know $\int_{0}^{1} ∣ h_{n} (x) - h (x) ∣ d x \to 0$ , and we have $\int_{0}^{1} ∣ f_{n} (x) - h_{n} (x) ∣ d x = k = 0 \sum n - 1 \int_{\frac{k}{n}}^{\frac{k + 1}{n}} ∣ f_{n} (x) - h_{n} (x) ∣ d x$ $\leq k = 0 \sum n - 1 \frac{1}{n} n \int_{\frac{k}{n}}^{\frac{k + 1}{n}} ∣ f (t) - h (t) ∣ d t = \int_{0}^{1} ∣ f (t) - h (t) ∣ d t .$ Then we estimate $\int_{0}^{1} ∣ f_{n} (x) - f (x) ∣ d x \leq \int_{0}^{1} ∣ f_{n} (x) - h_{n} (x) ∣ + ∣ h_{n} (x) - h (x) ∣ + ∣ h (x) - f (x) ∣ d x$ $\leq 2 δ + \int_{0}^{1} ∣ h_{n} (x) - h (x) ∣ d x .$ Since $δ$ is arbitrary, we are done.
3.	If $f$ is a simple function, it is trivial by the above.
4.	Finally for any measurable $f$ , WLOG we assume $f \geq 0$ . Let an increasing sequence of simple functions approximate it and...

$□$

Problem 40. Let $f_{n} : [0, 1] \to R$ , $f_{n} \geq 0$ Lebesgue measurable, and converges to $f$ a.e.

Let $F (x) = \int_{0}^{x} f (y) d y, F_{n} (x) = \int_{0}^{x} f_{n} (y) d y$ . Then: $\int_{0}^{1} f + F d x \leq lim inf \int_{0}^{1} f_{n} + F_{n} d x$

Proof. By Fatou’s Lemma,

lim inf \int_{0}^{1} f_{n} (x) + F_{n} (x) d x \geq \int_{0}^{1} lim inf (f_{n} (x) + F_{n} (x)) d x

= \int_{0}^{1} f (x) + lim inf \int_{0}^{x} f (y) d y d x

\geq \int_{0}^{1} f (x) + \int_{0}^{x} lim inf f (y) d y d x = \int_{0}^{1} f (x) + F (x) d x

$□$

Problem 41. Let $f, f_{n}, g \in L^{2} (R), n = 1, 2, \dots$ , $f_{n}$ converges to $f$ a.e. and $\int_{R} ∣ f_{n} (x) ∣^{2} d x \leq 1.$

Then $n \to \infty lim \int_{R} ∣ f_{n} (x) - f (x) ∣∣ g (x) ∣ d x = 0.$

Proof. For any $ε > 0$ , there exists a $δ > 0$ such that for any $m (A) < δ$ we have $\int_{A} g^{2} < ε$

At the same time, denote $E_{n} = {∣ x ∣ > n}$ , then there exists a $N$ : $\int_{E_{N}} g^{2} < ε$

By Erogoff’s theorem, there exists a measurable $F$ such that $m (R \ (E_{N} \cup F)) < δ$ , and $f_{n} (x) ∣_{F} ⇉ f (x) ∣_{F}$ . Then there exits a $N_{1}$ such that for any $k \geq N_{1}, x \in F$ , we have $∣ f_{k} - f ∣^{2} < ε / m (F)$ . Thus $\int_{F} ∣ f_{k} - f ∣^{2} < \frac{ε}{m ( F )} m (F) = ε .$

Again we also have $\int_{R \ (E_{N} \cup F)} g^{2} < ε \Rightarrow \int_{R \ F} g^{2} < 2 ε .$

Thus for any $n \geq N + N_{1}$ , we have $\int_{R} ∣ f_{n} - f ∣ g \leq \int_{R - F} ∣ f_{n} - f ∣ g + \int_{F} ∣ f_{n} - f ∣ g$ $\leq \int_{R} ∣ f_{n} - f ∣^{2} \int_{R - F} g^{2} + \int_{F} ∣ f_{n} - f ∣^{2} \int_{R} g^{2}$ $\leq 2 2 ε + ∥ g ∥_{2} ε .$

Then we are done.

$□$

Problem 42. Let $f_{n}$ be a sequence of non-negative Borel measurable functions on $[0, 1]$ that converges to $f$ a.e. Moreover, we have $\int_{0}^{1} f_{n} (x) lo g (f_{n} (x) + 2) d x \leq 1.$

Then $f$ is Lebesgue measurable, and $lim \int_{0}^{1} ∣ f_{n} (x) - f (x) ∣ d x = 0$ .

Proof. We prove it by Vitali Convergence Theorem:

Lemma. Let $F$ be a uniformly integrable and tight family of integrable functions, and a subfamily $f_{n}$ converges to $f$ pointwise, then $f$ is integrable, and $lim \int_{0}^{1} ∣ f_{n} (x) - f (x) ∣ d x = 0$ .

Since $m ([0, 1]) = 1 < \infty$ , the tightness is trivial. We only need to show that $f_{n}$ is uniformly integrable.

For any $ε > 0$ , we choose a $M > 0$ such that $ε lo g (M + 2) > 1$ , then denote $F_{n} = {f_{n} \geq M}$ . Thus for $δ = ε / M$ , we have for any $m (E) < δ$ : $\int_{E} f_{n} = \int_{E \cap F_{n}} f_{n} + \int_{E \ F_{n}} f_{n} \leq \frac{1}{lo g ( M + 2 )} + M m (E) < 2 ε$

Thus we are done.

$□$

Problem 43. Let $f : R \to R$ be Lebesgue integrable, such that $ε ↘ 0 lim inf \int_{R^{2}} \frac{∣ f ( x ) f ( y ) ∣}{∣ x - y ∣ ^{2} + ε} d x d y < \infty.$ Prove that $f = 0$ a.e.

Proof. Without loss of generality, assume that $f (x) \geq 0.$
By Fatou’s lemma we have $\int_{R^{2}} \frac{f ( x ) f ( y )}{∣ x - y ∣ ^{2}} d x d y \leq M < \infty,$ where $M$ denotes the limit given above. Suppose the otherwise, there exists an $n \in N^{*}$ such that $μ (E := {x ∣ f (x) \geq \frac{1}{n}}) > 0$ .
Then we have $\int_{E \times E} \frac{1}{∣ x - y ∣ ^{2}} d x d y \leq n^{2} M .$ It indicates that $\frac{1}{∣ x - y ∣ ^{2}} χ_{E} (x) χ_{E} (y)$ is integrable, and that Fubini’s theorem works.
Since $μ (E) > 0$ , we can take a Lebesgue density point $x \in E$ and an $r$ such that $μ (E \cap (x - δ, x + δ)) > δ, \forall δ \in (0, r) .$
Thus $\int_{E} \frac{1}{∣ x - y ∣ ^{2}} d y \geq \frac{1}{δ} \to \infty$ as $δ \to 0,$ a contradiction to Fubini’s theorem since Lebesgue density points also have positive measure.

$□$

Problem 44. Let $f : R \to R$ be Lebesgue integrable. Then for $x \in R$ a.e. the series converges: $n = 1 \sum \infty \frac{1}{n} f (x - n) .$

Proof. We prove that for any $a < b$ , the series is integrable on $[a, b]$ . Observe that $\int_{a}^{b} n = 1 \sum \infty \frac{1}{n} f (x - n) d x = n = 1 \sum \infty \frac{1}{n} \int_{a}^{b} f (x - n) d x$ $= n = 1 \sum \infty \frac{1}{n} \int_{R} f (x) χ_{[a - n, b + n]} d x = \int_{R} f (x) S (x) d x$

Where we denote $S (x) = \sum_{n = 1}^{\infty} \frac{1}{n} χ_{[a - n, b - n]}$ . We claim that $S (x)$ is bounded by $C = C (a, b)$ independent of $x$ :

For any $x \in R$ , the sum is taken on those $n$ with $a - n \leq x \leq b - n$ , namely: $S (x) = a - x \leq n \leq b - x \sum \frac{1}{n}$

If $a - x \leq 1$ , we have $S (x) = 1 \leq n \leq (b - x)^{2} \sum \frac{1}{n} \leq \int_{0}^{(b - x)^{2}} \frac{d t}{t} = 2 (b - x) \leq 2 (b - a + 1) .$

If $a - x > 1$ , we have $S (x) = (a - x)^{2} \leq n \leq (b - x)^{2} \sum \frac{1}{n} \leq \int_{(a - x)^{2} - 1}^{(b - x)^{2}} \frac{d t}{t}$ $= 2 ((b - x) - (a - x)^{2} - 1) \leq 2 (b - a + 1) .$

The last inequality by the monotonicity.

$□$

Problem 45. Define $f (0) = 0$ , and $f (x) = x^{2} sin (1/ x)$ for $x \neq = 0$ , then $f$ is a function of bounded variation on $[- 1, 1]$ .

Proof. Trivial if you make use of Lagrange’s mean value theorem.

$□$

Problem 46. Construct a monotone increasing function $f : R \to R$ , such that the set of continuous points of $f$ is the complement of $Q$ .

Proof. It suffices to consider $[0, 1] \to R$ and extend by $f (x + 1) = f (x) + f (1)$ . Let $R (x)$ denote the Riemann function, and define $f (x) : [0, 1] \to R$ : $R (x) = {\frac{1}{q}, 0, x = \frac{p}{q} \in [0, 1], p, q \in N, (p, q) = 1 x \in [0, 1] \ Q, f (x) = 0 \leq r \leq x \sum R^{3} (r)$

Since $f (x) \leq f (1) = \sum ϕ (n) / n^{3} < \sum 1/ n^{2}$ , $f (x)$ is well defined. The monotone property is obvious.

For any $x_{0} = p / q$ , the discontinuity follows from the observation: $\forall δ > 0, \exists x_{0} - δ < x < x_{0}, f (x_{0}) - f (x) \geq \frac{1}{q ^{3}}$

Now for any $x_{0} \in [0, 1] \ Q$ , we will show that $f (x)$ is continuous at $x_{0}$ . For each $ε > 0$ , denote $K = [1/ ε] + 1$ , then those $x = p / q$ with $q \leq K$ is finite. Let $δ$ be half of the minimum distance between the points and $x_{0}$ . Then for any $x \in B (x_{0}, δ)$ , we have $∣ f (x) - f (x_{0}) ∣ \leq r \in I \sum R^{3} (r) \leq n \geq K + 1 \sum \frac{ϕ ( n )}{n ^{3}} \leq \frac{1}{K} \leq ε,$

where $I$ is a close interval with end points $x, x_{0}$ .

$□$

Problem 47. Let $f : R \to R$ be monotone increasing, $E \subset R$ is Lebesgue measurable, For any $ε > 0$ , there exists a sequence of open intervals $(a_{i}, b_{i})$ , such that $E \subset ⋃ (a_{i}, b_{i}), \sum ∣ f (b_{i}) - f (a_{i}) ∣ < ε$

Then $f^{'} (x) = 0$ a.e. $x \in E$ .

Proof. The monotone property implies that $f$ is differentiable a.e. and $f^{'}$ is integrable. For any $ε > 0$ , $\int_{E} f^{'} (x) d x \leq \sum \int_{a_{i}}^{b_{i}} f^{'} (x) d x \leq \sum f (b_{i}) - f (a_{i}) < ε$

Thus

\int_{E} f^{'} (x) d x = 0

. We have

f^{'} (x) = 0

a.e.

x \in E

.

$□$

Problem 48. Let $f : [0, 1] \to [0, 1]$ be a continuous bijection, but not absolutely continuous. Then there exists $E \subset [0, 1]$ , such that $m (E) = 0, m (f (E)) > 0$ .

Proof. First we prove two lemmas.

Lemma. Let $f$ be differentiable on $E \subset R$ , and $∣ f^{'} ∣ \leq M$ on $E$ , then $m^{*} (f (E)) \leq M m^{*} (E)$ .

Proof. It is a more general case of 22, thus can be proved in a similar way.

$□$

Lemma. Let $f$ be measurable on $[a, b]$ , $E \subset [a, b]$ is measurable, and $f$ is differentiable everywhere on $E$ , then $m^{*} (f (E)) \leq \int_{E} ∣ f^{'} ∣$ .

Proof. For each $ε > 0$ , denote $E_{k} = {x \in E : (k - 1) ε \leq ∣ f^{'} ∣ < k ε}$ , by the first lemma we have $m^{*} (f (E_{k})) \leq k ε m (E_{k}) = (k - 1) ε m (E_{k}) + ε m (E_{k}) \leq \int_{E_{k}} ∣ f^{'} ∣ + ε m (E_{k})$

Add them together, we obtain

m^{*} (f (E)) \leq \int_{E} ∣ f^{'} ∣ + ε m (E)

, then we are done since

ε

was arbitrary.

$□$

Back to our proof, we will first show $f \in BV$ from continuous and bijective property. Then by assuming the conclusion is false, we will prove $f \in AC$ , a contradiction.

We have two approaches to prove $f \in BV$ . One is that $f$ is monotone as a continuous bijection. The other one can deal with more general cases.

$\forall0 = x_{0} < x_{1} < \dots < x_{n} = 1$ , we denote $J_{k}$ as the close interval with endpoints $f (x_{k - 1}), f (x_{k})$ . Then by continuity, we have $J_{k} \subset f ([x_{k - 1}, x_{k}]) = I_{k}$ . Thus $k = 1 \sum n ∣ f (x_{k}) - f (x_{k - 1}) ∣ = \int_{0}^{1} k = 1 \sum n χ_{J_{k}} d y \leq \int_{0}^{1} k = 1 \sum n χ_{I_{k}} d y \leq 1$

Where we used the bijective property. In fact, even not being bijective our conclusion $f \in BV$ still holds as long as the number of every point’s preimage is bounded by a same number.

Now assume $f$ preserves zero measure. By $f \in BV$ we know $f^{'}$ exists a.e. and it is integrable. Hence there exists $E \subset [0, 1]$ such that $m (E) = 0$ and $f^{'}$ exists everywhere in $[0, 1] \ E$ . By the assumption, $m (f (E)) = 0$ . We observe that $\forall (x, y) \subset [0, 1], ∣ f (y) - f (x) ∣ \leq m (f ([x, y])) \leq m^{*} (f ([x, y] \ E)) + m (f (E)) \leq \int_{x}^{y} ∣ f^{'} (t) ∣ d t$ , the last inequality by the second lemma.

Now we make use of the integrablility of $f^{'}$ and the absolute continuity of Lebesgue integral, for any $ε > 0$ , there exists $δ > 0$ , $\int_{A} ∣ f^{'} ∣ < ε$ as long as $m (A) < δ$ .

Finally we check the definition of absolute continuity of

f

. For each

ε > 0

, for any

0 \leq a_{1} < b_{1} < \dots < a_{n} < b_{n} \leq 1

with

\sum (b_{k} - a_{k}) < δ

, we have

k = 1 \sum n ∣ f (b_{k}) - f (a_{k}) ∣ \leq k = 1 \sum n \int_{a_{k}}^{b_{k}} ∣ f^{'} ∣ = \int_{⋃_{k = 1}^{n} (a_{k}, b_{k})} ∣ f^{'} ∣ < ε .

$□$

Problem 49. Let $f : [0, 1] \to R$ , prove the following are equivalent:

1.	$f \in AC$ , and there exists $h$ bounded and measurable, such that $f^{'} = h$ a.e.
2.	There exists $L > 0$ , such that for any $0 \leq x, y \leq 1$ , $∣ f (x) - f (y) ∣ \leq L ∣ x - y ∣$ .

Proof. $(2) \Rightarrow (1)$ : It follows easily from checking definition that $f \in AC$ . By Lebesgue differentiation theorem, $\exists h$ measurable, $h : [0, 1] \to R$ , such that $h = f^{'}$ a.e. For those differentiable points, $∣ f^{'} ∣$ is bounded by Lipschitz condition. For the rest, just assign $h = 0$ , then $h$ is bounded.

(1) \Rightarrow (2)

: Since Lebesgue differentiation theorem,

f (x) = f (0) + \int_{0}^{x} h (t) d t

. Thus

∣ f (y) - f (x) ∣ = ∣ ∣ \int_{x}^{y} h (t) d t ∣ ∣ \leq \int_{x}^{y} ∣ h (t) ∣ d t \leq L ∣ y - x ∣.

$□$

Problem 50. Let $f : R^{2} \to R$ , $f \in C^{1}$ and for any $(x_{0}, y_{0}) \in R^{2}$ , we have $\frac{\partial f}{\partial x} + \frac{\partial f}{\partial y} ∣ ∣_{(x_{0}, y_{0})} \neq = 0$

Then for $E = {(x, y) : f (x, y) = 0}$ is a set of measure zero.

Proof. On any straight line

y = x + t

, the directional derivative never vanishes, and also it is continuous, then

f

is absolutely monotone, with no more than one zero. Thus

m (E) \leq m ({0} \times R) = 0

.

$□$

Problem 51. Let $E \subset R$ be measurable and $m (E) > 0$ , and $f : R \to R$ be non-negative Lebesgue measurable function. If $F (x) = \int_{E} f (x - t) d t$ is Lebesgue integrable on $R$ , then $f$ is also Lebesgue integrable.

Proof. Observe by Tonelli’s theorem, $f (x - t)$ is measurable and $f \geq 0$ that $\infty > \int_{R} F (x) d x = \int_{R} \int_{R} f (x - t) χ_{E} (t) d t d x$ $= \int_{R} χ_{E} (t) \int_{R} f (x - t) d x d t = m (E) \int_{R} f (x) d x$

Thus

f

is also Lebesgue integrable.

$□$

$L^{p}$ spaces

Problem 52. Let $f_{n} : [0, 1] \to R$ be a sequence of Lebesgue integrable functions, and converges in measure to $f : [0, 1] \to R$ , which is Lebesgue measurable. Moreover we have $∥ f_{n} ∥_{3} \leq 1$ , then $f_{n} \to f$ in $L^{2} ([0, 1])$ .

Proof. For any $ε > 0$ , there exists $N$ such that for $E_{n} = {∣ f_{n} - f ∣ \geq ε}$ , we have $m (E_{n}) < ε$ for any $n > N$ .

$\int_{0}^{1} ∣ f_{n} - f ∣^{2} \leq \int_{E_{n}} ∣ f_{n} - f ∣^{2} + \int_{E_{n}^{c}} ∣ f_{n} - f ∣^{2}$ $\leq ε^{2} m (E_{n}^{c}) + (\int_{0}^{1} ∣ f_{n} - f ∣^{3})^{\frac{2}{3}} (m (E_{n}))^{\frac{1}{3}} \leq ε^{2} + ε^{\frac{1}{3}} ∥ f_{n} - f ∥_{3}^{2}$

Since $f_{n} \to f$ in measure, there is a subsequence $f_{n_{k}} \to f$ a.e. Thus we have $\int_{0}^{1} ∣ f ∣^{3} = \int_{0}^{1} lim inf ∣ f_{n_{k}} ∣^{3} \leq lim inf \int_{0}^{1} ∣ f_{n_{k}} ∣^{3} \leq 1,$

which implies

∥ f_{n} - f ∥_{3}^{2} \leq (∥ f_{n} ∥_{3} + ∥ f ∥_{3})^{2} \leq 4

. Thus we are done.

$□$

Problem 53. Let $1 \leq p < \infty$ , $f_{n}, f \in L^{p}$ , and $f_{n} \to f$ a.e. Then $∥ f_{n} - f ∥_{p} \to 0 \Leftrightarrow ∥ f_{n} ∥_{p} \to ∥ f ∥_{p}$ .

Proof. If $∥ f_{n} - f ∥_{p} \to 0$ , then $∣∥ f_{n} ∥_{p} - ∥ f ∥_{p} ∣ \leq ∥ f_{n} - f ∥_{p} \to 0$ , thus $∥ f_{n} ∥_{p} \to ∥ f ∥_{p}$ .

If $∥ f_{n} ∥_{p} \to ∥ f ∥_{p}$ , we notice that $∣ x ∣^{p}$ is lower convex, thus by Jensen’s inequality we have $∣ ∣ \frac{f _{n} - f}{2} ∣ ∣^{p} \leq \frac{∣ f _{n} ∣ ^{p} + ∣ f ∣ ^{p}}{2} .$

The right-hand side converges to $∣ f ∣^{p}$ a.e. and its integral also converges to the integral of $∣ f ∣^{p}$ , thus by DCT we have $\int ∣ ∣ \frac{f _{n} - f}{2} ∣ ∣^{p} \to \int 0 = 0,$

which means

∥ f_{n} - f ∥_{p} \to 0

.

$□$

Problem 54. Let $E, F \subset R$ be with finite Lebesgue measure.

1.	The convolution $χ_{E} * χ_{F}$ is continuous.
2.	$χ_{E} * χ_{F} \in L^{p} (R)$ for $1 \leq p < \infty$ .

Proof. (1) A more general case: let $f$ be integrable, $g$ be bounded and measurable, then $f * g$ is continuous.

We denote $Ψ : R \to L^{1} (R), x \mapsto f (x - y)$ and $Φ : L^{1} (R) \to R, h \mapsto \int_{R} h g$ , then $f * g = Φ \circ Ψ$ .

Now it suffices to show both $Φ$ and $Ψ$ are continuous.

For $Φ$ , it is trivial by that $g$ is bounded and measurable.

For $Ψ$ , we observe that as $h \to 0$ , we have $\int_{R} ∣ f (x - y) - f (x + h - y) ∣ d y = \int_{R} ∣ f (y - h) - f (y) ∣ d y \to 0$

Which is a common proposition used very common, for instance in the proof of the density of $C_{c}$ in $L^{p}$ .

(2) Since

χ_{E} \in L^{1}, χ_{F} \in L^{p}

, we have

χ_{E} * χ_{F} \in L^{p} (R)

.

$□$

Problem 55. Let $f : [0, 1] \to R$ be Lebesgue measurable, and for any $g \in L^{2} [0, 1]$ , we have $f g \in L^{2} ([0, 1])$ , then $f \in L^{\infty} ([0, 1])$ .

Proof. If $f \in / L^{\infty} ([0, 1])$ , then for $E_{n} = {n \leq ∣ f ∣ < n + 1}$ , we have $m (E_{n}) > 0$ frequently. Take a subsequence while not changing the notion, we have $f \geq \sum_{n = 1}^{\infty} n χ_{E_{n}}$ , and then $f^{2} \geq \sum_{n = 1}^{\infty} n^{2} χ_{E_{n}}$ .

Let

g = \sum_{n = 1}^{\infty} \frac{χ _{E_{n}}}{n m ( E _{n} )}

, then

\int_{0}^{1} g^{2} = \sum_{n = 1}^{\infty} \frac{1}{n ^{2}} < \infty

,

g \in L^{2} ([0, 1])

. But

\int_{0}^{1} f^{2} g^{2} \geq \sum_{n = 1}^{\infty} 1 = \infty

.

$□$

Problem 56. Let $f : R \to R$ be Lebesgue integrable, then $h \to 0 lim \int_{R} ∣ f (x + h) - f (x) ∣ d x = 0.$

Proof.

Since in our system the density of

C_{c}^{\infty} (R)

in

L^{1} (R)

was proved through this proposition, we have to prove it in another way, otherwise we will fall into circular argument. So you are invited to consult related books for answers.

$□$

Problem 57. Let $f_{n}, f : [0, 1] \to R$ be Lebesgue integrable, and $f_{n} \to f$ in $L^{1} ([0, 1])$ .

1.	There exists a subsequence $f_{n_{k}}$ that converges to $f$ a.e.
2.	Show by a example that ‘a.e.’ can not be replaced with ‘uniformly’.

Proof. (1) It suffices to show $f_{n} \to f$ in measure. For any $η > 0$ , we denote $E = {∣ f_{n} - f ∣ \geq η}$ , then observe $\int_{0}^{1} ∣ f_{n} - f ∣ d x \geq \int_{E} ∣ f_{n} - f ∣ d x \geq η m (E),$

which forces $m (E)$ to be null.

(2) Let

f_{n} = n χ_{[0, \frac{1}{n}]}, f = 0

, then for any subsequence

f_{n_{k}}

, we have

∣ f_{n_{k}} (0) - f (0) ∣ = n_{k}

.

$□$

Problem 58. Let $f : R \to R$ be a Lebesgue measurable bijection, and $f (x + y) = f (x) + f (y)$ , then $f$ is continuous.

Proof. Using Lusin’s theorem, there exists a compact $K \subset [0, 1]$ such that $m (K) > 2/3$ and $f$ continuous on $K$ . Let $ε > 0$ . In fact, $f$ is uniformly continuous on $K$ , so there exists $δ > 0$ such that $∣ x - y ∣ < δ$ implies $∣ f (x) - f (y) ∣ < ε$ ; without loss of generality, suppose $δ < 1/3$ .

Let $0 < h < δ$ . Notice that the intersection between $K$ and $K - h$ is nonempty; otherwise $1 + h = μ ([- h, 1]) \geq μ (K \cup K - h) = μ (K) + μ (K - h) = 2 μ (K) > 4/3$

So $h > 1/3$ whereas $h < δ < 1/3$ by assumption.

Let $x_{0} \in K \cap (K - h)$ . We have $∣ f (x_{0} + h) - f (x_{0}) ∣ < ε$ , hence $∣ f (h) ∣ < ε$ because $f$ is additive. You deduce that $f$ is continuous at $0$ .

Finally, it is straightforward to conclude that

f

is continuous on

R

.

$□$

Problem 59. $f : [0, 1] \to R$ be absolutely continuous, and $f^{'} \in L^{2} ([0, 1])$ , then there exists a constant $C > 0$ such that for any $0 \leq x \leq y \leq 1$ , we have $∣ f (x) - f (y) ∣ \leq C y - x$ .

Proof. $∣ f (x) - f (y) ∣ = ∣ ∣ \int_{x}^{y} f^{'} (t) d t ∣ ∣ \leq \int_{x}^{y} ∣ f^{'} (t) ∣ d t \leq \int_{0}^{1} ∣ f^{'} (t) ∣^{2} d t y - x$

Where we used the Hölder’s inequality.

$□$

Problem 60. Let $H$ be the set of every absolutely continuous functions $f : [0, 1] \to R$ that satisfies $∥ f ∥_{H} := ∥ f ∥_{2} + ∥ f^{'} ∥_{2} < \infty.$

Then $(H, ∥ \cdot ∥_{H})$ is Banach space.

Proof. It is obvious that $∥ \cdot ∥_{H}$ is a norm. Then it suffices to check any Cauchy sequence converges to some point in $H$ .

If $f_{n}$ is Cauchy in $H$ , then $f_{n}$ and $f_{n}^{'}$ are both Cauchy in $L^{2} ([0, 1])$ . Thus we assume $f_{n} \to f, f_{n}^{'} \to g$ in $L^{2} ([0, 1])$ . To show $f_{n} \to f$ in $H$ , we must check $f^{'} = g$ a.e.

Since $f_{n} \in A C$ , we have $f_{n} (x) = f_{n} (0) + \int_{0}^{x} f_{n}^{'} (t) d t$

In the following we will deduce $f (x) = f (0) + \int_{0}^{x} g (t) d t$ from it, which implies $f^{'} = g$ a.e.

Since $f_{n} \to f$ in $L^{2} ([0, 1])$ , we have a subsequence $f_{n_{k}} \to f$ a.e.

By Holder’s inequality we have $∣ ∣ \int_{0}^{x} f_{n}^{'} (t) d t - \int_{0}^{x} g (t) d t ∣ ∣ \leq x \int_{0}^{x} (f_{n}^{'} (t) - g (t))^{2} d t \to 0$

Thus we are done by taking the limit in the subsequence.

$□$

Problem 61. Let $f : R \to R$ be a Lebesgue integrable, and for any $φ : R \to R$ such that $φ \geq 0$ is bounded and continuous, we have $\int φ f \geq 0$ . Then $f \geq 0$ a.e.

Proof. If $f < 0$ on $E$ with $m (E) > 0$ , then $\int_{E} f = - A < 0$ , where $A > 0$ .

By the absolutely continuity of the integral of $∣ f ∣$ , $\exists δ > 0$ , and $\int_{T} ∣ f ∣ < A /2$ as long as $m (T) < δ$ .

Using Lusin’s theorem, there exists

h : R \to [0, 1]

continuous, such that for

F = {h \neq = χ_{E}}

, we have

m (F) < δ

. Then

∣ \int (h - χ_{E}) f ∣ \leq \int_{F} ∣ f ∣ < A /2

. Hence

\int h f = \int (h - χ_{E}) f + \int χ_{E} < A /2 + (- A) = - A /2 < 0

.

$□$

Problem 62. Let $f_{n} \in L^{2} ([0, 1])$ , and constants $A, B$ such that for each $n$ , the following holds: $0 < A < ∥ f_{n} ∥_{1} \leq ∥ f_{n} ∥_{2} < B .$

Let a sequence of non-negative reals $c_{n}$ such that for $F (x) = \sum_{1}^{\infty} ∣ c_{n} f_{n} (x) ∣$ , we have $F (x) < \infty$ a.e. Denote $E_{n} = {F (x) > n}$ , prove the following:

1.	$lim_{n \to \infty} m (E_{n}) = 0$ .
2.	$\int_{E_{n}} ∣ f_{k} (x) ∣ d x \leq B m (E_{n})$ .
3.	$\sum_{1}^{\infty} c_{k} < \infty$ .

Proof. (1) $lim_{n \to \infty} m (E_{n}) = m (⋂_{n = 1}^{\infty} E_{n}) = m ({F (x) = \infty}) = 0.$

(2) $\int_{E_{n}} ∣ f_{k} ∣ \leq (\int_{E_{n}} ∣ f_{k} ∣^{2})^{\frac{1}{2}} (\int_{E_{n}} 1^{2})^{\frac{1}{2}} \leq ∥ f ∥_{2} m (E_{n}) \leq B m (E_{n}) .$

(3) From (2) we know that $\int_{E_{n}^{c}} ∣ f_{k} (x) ∣ d x \geq A - B m (E_{n})$ .

By (1), there exists a sufficiently large $n$ such that $\int_{E_{n}^{c}} ∣ f_{k} (x) ∣ d x \geq A /2 > 0$ .

Now sum the above inequalities over all

k \geq 1

with weights

c_{k}

. This leads to the following:

\int_{E_{n}^{c}} ∣ F (x) ∣ d x \geq \frac{A}{2} k \geq 1 \sum c_{k} .

But the left hand side is finite according to the choice of

E_{n}

, so

k \geq 1 \sum c_{k} < \infty.

$□$

Problem 63. Let $F$ be a nonempty set of some Lebesgue integrable functions on $R$ that satisfies the following:

•	If $f, g \in F$ , set $h (x) = max (f (x), g (x))$ , then $h \in F$ .
•	$M = sup {\int_{R} f (x) d x} < \infty$ .

Then there exists $φ$ such that the following holds:

•	For any $f \in F$ , $f \leq φ$ holds a.e.
•	$\int_{R} φ = M$ .

Proof. Select a sequence ${f_{n}}$ in $F$ such that $\int f_{n} \to M$ . Then let $g_{n} = max (f_{1}, \dots, f_{n})$ , and $φ = sup f_{n}$ , we have for any fixed $x$ , $g_{n} (x)$ increases to $φ (x)$ . Thus $lim \int g_{n} = \int φ$ . But on one hand $g_{n} \in F \Rightarrow \int g_{n} \leq M \Rightarrow lim \int g_{n} \leq M$ , on the other hand $g_{n} \geq f_{n} \Rightarrow lim \int g_{n} \geq lim \int f_{n} = M$ . Thus $\int φ = M$ .

If there is some $f \in F$ such that $f > φ$ on a positive measure, consider $h_{n} = max (g_{n}, f) \in F$ .

By the constructions above, $(h_{n})_{n \geq 1}$ is an increasing sequence of functions and thus converges pointwise to a function $h$ .

Since by the given condition that $\int h_{n} \leq M$ and the fact that $h_{n} \geq h_{1}$ where $h_{1}$ is integrable, the monotone convergence theorem holds for $(h_{n})_{n \geq 1}$ and thus $\int h \leq M$ .

However, $h > φ$ on a positive measure and $h \geq φ$ everywhere. These imply that $M \geq \int h > \int φ = M,$ which is absurd.

(Proof by contradiction is not necessary, but it is shorter.)

$□$

Problem 64. Let $A = (a_{ij})_{1 \leq i, j \leq n}$ be an $n -$ order real square symmetric matrix, and $f (x_{1}, x_{2}, \dots, x_{n}) = exp (- \sum_{j, k = 1}^{n} x_{jk} a_{j} a_{k})$ .

1.	Prove that $f \in L^{1} (R^{n})$ iff $A$ is positive definite.
2.	Assuming $A$ is positive definite, compute $\int_{R^{n}} f (x) d x$ .

Proof.

1.

Since $A$ is real and symmetric, it can be orthogonal diagonalized. Assume $Q$ is orthogonal with $det Q = 1$ , such that $Q A Q^{- 1} = D = diag {λ_{1}, λ_{2}, \dots, λ_{n}}$ , where each $λ_{i}$ is an eigenvalue of $A$ .

Then $f (x) = exp (- x^{T} A x) = exp (- x^{T} Q^{T} D Q x) = exp (- y^{T} Dy)$ , where we denote $y = Q x$ .

Thus $\int_{R^{n}} f (x) d x = \int_{R^{n}} exp (- y^{T} Dy) d x = \int_{R^{n}} exp (- y^{T} Dy) d y = \int_{R^{n}} exp (- k = 1 \sum n λ_{k} y_{k}^{2}) d y_{1} \dots d y_{n} .$

Therefore, $f \in L^{1} (R^{n})$ iff $\forall i = 1, 2, \dots n, λ_{i} > 0$ iff $A$ is positive definite.

2.

By the above discussions, using Tonelli’s theorem we have $\int_{R^{n}} f (x) d x = \int_{R^{n}} exp (- k = 1 \sum n λ_{k} y_{k}^{2}) d y_{1} \dots d y_{n} = k = 1 \prod n \int_{R} exp (- λ_{k} t^{2}) d t = \frac{π ^{n}}{det A} .$

$□$

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用户: Solution/ 习题: 实分析

Sets

Measure Space

Measurable Functions

Lebesgue Integral

$L^{p}$ spaces

Sets

Measure Space

Measurable Functions

Lebesgue Integral

Lp spaces

$L^{p}$ spaces