Integration: Exercises RCh4

Integration: Exercises R Ch 4

Arun Ram
Department of Mathematics and Statistics
University of Melbourne
Parkville, VIC 3010 Australia
aram@unimelb.edu.au

Last updates: 10 April 2011

Integration: Exercises R Ch 4

If $M$ is a closed subspace of $H$ , prove that $M = {(M^{⊥})}^{⊥}$ . Is there a similar true statement for spaces $M$ which are not necessarily closed?
Let ${x_{n} | n = 1, 2, \dots}$ be a linearly independent set of vectors in $H$ . Show that the following construction yields an orthonormal set ${u_{n}}$ such that ${x_{1}, \dots x_{N}}$ and ${u_{1}, \dots u_{N}}$ have the same span for all $N$ .
Put $u_{1} = x_{1} / ‖ x_{1} ‖$ . Having $u_{1}, \dots u_{n - 1}$ define
$v_{n} = x_{n} - \sum_{=1}^{n - 1} (x_{n}, u_{i}) u_{i}, u_{n} = v_{n} / ‖ v_{n} ‖$ .
Note that this leads to a proof of the existence of a maximal orthonormal set in separable Hilbert spaces which makes no appeal to the Hausdorff maximality principle. (A space is separable if it contains a countable dense subset.)
Show that $L^{p} (T)$ is separable if $1 \leq p < \infty$ , but that $L^{\infty} (T)$ is not separable.
Show that $H$ is separable if and only if $H$ contains a maximal orthonormal system which is at most countable.
If $M = {x | L x = 0}$ , where $L$ is a continuous linear functional on $H$ , prove that $M^{⊥}$ is a space of dimension $1$ (unless $M = H$ ).
Let ${u_{n}}$ be an orthonormal set in $H$ . Show that this gives an example of a closed and bounded set which is not compact. Let $Q$ be the set of all $x \in H$ of the form
$x = \sum_{i = 1}^{\infty} c_{n} u_{n}$ $(where | c_{n} | \leq \frac{1}{n})$ .
Prove that $Q$ is compact. ( $Q$ is called the Hilbert cube.)
More generally, let ${δ_{n}}$ be a sequence of positive numbers, and let $S$ be the set of all $x \in H$ of the form
$x = \sum_{i = 1}^{\infty} c_{n} u_{n}$ $(where | c_{n} | \leq δ_{n})$ .
Prove that $S$ is compact if and only if $\sum_{1}^{\infty} δ_{n}^{2} < \infty$ .
Prove that $H$ is not locally compact.
Suppose ${a_{n}}$ is a sequence of positive numbers such that $\sum a_{n} b_{n} < \infty$ , whenever $b_{n} \leq 0$ and $\sum b_{n}^{2} < \infty$ . Prove that $\sum a_{n}^{2} < \infty$ .
Suggestion: If $\sum a_{n}^{2} = \infty$ then there are disjoint sets $E_{k}$ ( $k = 1, 2, 3, \dots$ ) so that
$\sum_{n \in E_{k}} a_{n}^{2} > 1$ .
Define $b_{n}$ so that $b_{n} = c_{k} a_{n}$ for $n \in E_{k}$ . For suitably chosen $c_{k}$ , $\sum a_{n} b_{n} = \infty$ although $\sum b_{n}^{2} < \infty$ .
If $H_{1}$ and $H_{2}$ are two Hilbert spaces, prove that one of them is isomorphic to a subspace of the other. (Note that every closed subspace of a Hilbert space is a Hilbert space.)
If $A \subseteq [0, 2 π]$ and $A$ is measurable, prove that
$\lim_{n \to \infty} \int_{A} \cos n x d x = \lim_{n \to \infty} \int_{A} \sin n x d x = 0$ .
Let $n_{1} < n_{2} < n_{3} < \dots$ be positive integers, and let $E$ be the set of all $x \in [0, 2 π]$ at which ${\sin n_{k} x}$ converges. Prove that $m (E) = 0$ . Hint: $2 \sin^{2} α = 1 - \cos 2 α$ , so $\sin n_{k} x \to \pm 1 / \sqrt{2}$ a.e. on $E$ , by Exercise 9.
Find a nonempty closed set $E$ in $L^{2} (T)$ that contains no element of smallest norm.
The constants $c_{k}$ in Sec. 4.24 were shown to be such that $k^{- 1} c_{k}$ is bounded. Estimate the relevant integral more precisely and show that
$0 < \lim_{k \to \infty} k^{- 1 / 2} c_{k} < \infty$ .
Suppose $f$ is a continuous function on $ℝ^{1}$ with period 1. Prove that
$0 < \lim_{N \to \infty} \frac{1}{N} \sum_{n = 1}^{N} f (n α) = \int_{0}^{1} f (t) d t$
for every irrational real number $α$ . Hint: Do it first for
$f (t) = \exp (2 π i k t), k = 0, \pm 1, \pm 2, \dots$ .
Compute
$\min_{a, b, c} \int_{- 1}^{1} {| x^{3} - a - b x - c x^{2} |}^{2} d x$
and find
$\max \int_{- 1}^{1} x^{3} g (x) d x$
where $g$ is subject to the restrictions
$\int_{- 1}^{1} g (x) d x = \int_{- 1}^{1} x g (x) d x = \int_{- 1}^{1} x^{2} g (x) d x = 0; \int_{- 1}^{1} {| g (x) |}^{2} d x = 1$ .
Compute
$\min_{a, b, c} \int_{0}^{\infty} {| x^{3} - a - b x - c x^{2} |}^{2} e^{- x} d x$ .
State and solve the corresponding maximum problem, as in Exercise 14.
If $x_{0} \in H$ and $M$ is a closed linear subspace of $H$ , prove that
$\min {‖ x - x_{0} ‖ | x \in M} = \max {| (x_{0}, y) | | y \in M^{⊥}, ‖ y ‖ = 1}$ .
Show that there is a continuous one-to-one mapping $γ$ of $[0, 1]$ into $H$ such that $γ (b) - γ (a)$ is orthogonal to $γ (d) - γ (c)$ whenever $0 \leq a \leq b \leq c \leq d \leq 1$ . ( $γ$ may be called a "curve with orthogonal increments.") Hint: Take $H = L^{2}$ , and consider characteristic functions of certain subsets of $[0, 1]$ .
Define $u_{s} (t) = e^{i s t}$ for all $s \in ℝ^{1}$ , $t \in ℝ^{1}$ . Let $X$ be the complex vector space consisting of all finite linear combinations of these functions $u_{s}$ . If $f \in X$ and $g \in X$ , show that
$(f, g) = \lim_{A \to \infty} \frac{1}{2 A} \int_{- A}^{A} f (t) \overline{g (t)} d t$
exists. Show that this inner product makes $X$ into a unitary space whose completion is a non-separable HIlbert space $H$ . Show also that ${u_{s} | s \in ℝ^{1}}$ is a maximal orthonormal set in $H$ .
Fix a positive integer $N$ . Put $ω = e^{2 π i / N}$ . Prove the orthogonality relations
$\frac{1}{N} \sum_{n = 1}^{N} ω^{n k} = {\begin{matrix} 1, & if k = 0, \\ 0, & if 1 \leq k \leq N - 1, \end{matrix}$
and use them to derive the identities
$(x, y) = \frac{1}{N} \sum_{n = 1}^{N} {‖ x + ω^{n} y ‖}^{2} ω^{n}$
that hold in every inner product space if $N \geq 3$ . Show also that
$(x, y) = \frac{1}{2 π} \int_{- π}^{π} {‖ x + e^{i θ} y ‖}^{2} e^{i θ} d θ$ .

Notes and References

These exercises are taken from [Ru, Chapt. 4] for a course in "Measure Theory" at the Masters level at University of Melbourne.

References

[RuB] W. Rudin, Principles of Mathematical Analysis, Third edition, McGraw-Hill, 1976. MR??????.

[Ru] W. Rudin, Real and complex analysis, Third edition, McGraw-Hill, 1987. MR0924157.

page history