Measure Theory/Monotone Functions Differentiable

Recall that every function of bounded variation can be decomposed into a difference of two monotonically increasing functions. Now assume that every monotone function is differentiable a.e. Prove that every function of bounded variation is differentiable a.e.

Use the observations above to prove that, for each ${\displaystyle x\in E_{c}}$ and for each ${\displaystyle \delta \in {\mathbb {R}}^{+}}$ there is some ${\displaystyle I\in {\mathcal {C}}'}$ such that ${\displaystyle x\in I}$ and ${\displaystyle \ell (I)<\delta }$. Hint: Consider the interval ${\displaystyle [x,x+t]}$.

Assume E has finite outer-measure and ${\displaystyle {\mathcal {F}}}$ covers E in the sense of Vitali. Show that for any ${\displaystyle \delta \in {\mathbb {R}}^{+}}$ there exists a finite disjoint sub-collection ${\displaystyle \{I_{1},\dots ,I_{n}\}\subseteq {\mathcal {F}}}$ such that

${\displaystyle \lambda ^{*}\left(E\smallsetminus \bigcup _{k=1}^{n}I_{k}\right)<\delta }$

Here are some guiding steps.

1) Let ${\displaystyle {\mathcal {O}}}$ be an open set such that ${\displaystyle E\subseteq {\mathcal {O}}}$ and ${\displaystyle \lambda ^{*}({\mathcal {O}})<\lambda ^{*}(E)+\delta }$.  (If it is not clear, then you may want to prove that such a set exists.)

2) Construct the collection ${\displaystyle {\mathcal {F}}'\subseteq {\mathcal {F}}}$ where ${\displaystyle I\in {\mathcal {F}}'}$ if ${\displaystyle I\subseteq {\mathcal {O}}}$.  Argue that ${\displaystyle {\mathcal {F}}'}$ also covers E in the sense of Vitali.

3) Inductively construct a finite collection of ${\displaystyle \{I_{k}\}_{k=1}^{n}\subseteq {\mathcal {F}}'}$ by first picking an arbitrary ${\displaystyle I=I_{1}\in {\mathcal {F}}'}$.  

4) Next construct, for each ${\displaystyle 1\leq m}$ and collection ${\displaystyle \{I_{k}\}_{k=1}^{m}}$, the collection of all intervals in ${\displaystyle {\mathcal {F}}'}$ which are disjoint from all of the intervals so far.
 ${\displaystyle \quad {\mathcal {F}}'_{m}=\left\{I\in {\mathcal {F}}':I\cap \bigcup _{k=1}^{m}I_{k}\right\}}$
Also construct the set of all lengths of these intervals in ${\displaystyle {\mathcal {F}}'_{m}}$ and argue that this is a nonempty set of real numbers bounded above, and therefore has a supremum, call it ${\displaystyle s_{m}}$.  Infer that there is some ${\displaystyle I_{m+1}\in {\mathcal {F}}'_{m}}$ with ${\displaystyle s_{m}/2<\ell (I_{m+1})}$.

5) For each ${\displaystyle 1\leq m}$ argue that ${\displaystyle s_{m+1}<s_{m}/2}$.

6) The path home should be not very hard to find from here.  

Explain why the open set ${\displaystyle {\mathcal {O}}}$ was necessary in the proof above.

We have proved Vitali's Lemma for the purposes of proving our theorem about monotone functions. However, there is a further property that this finite collection, ${\displaystyle \{I_{k}\}_{k=1}^{n}}$, has which may prove useful later. We might as well observe and prove it now, while we're here.

Prove that ${\displaystyle E\subseteq \bigcup _{k=1}^{n}(5*I_{k})}$. Recall that the notation ${\displaystyle 5*I_{k}}$ means the interval with the same center as ${\displaystyle I_{k}}$ but five times the width.

Suggestions for how to proceed: Let ${\displaystyle x\in E}$ and of course if ${\displaystyle x\in \bigcup _{k=1}^{n}I_{k}}$ then the proof is finished.

1) Observe that if ${\displaystyle E\subseteq \bigcup _{k=1}^{n}I_{k}}$ then the proof is finished.  Otherwise we only need to consider the case that ${\displaystyle x\not \in \bigcup _{k=1}^{n}I_{k}}$.

2) Infer that there is an ${\displaystyle I\in {\mathcal {F}}_{n}'}$ with ${\displaystyle x\in I}$.

3) Note that although we only took the intervals ${\displaystyle I_{1},\dots ,I_{n}}$ in the exercise above, the sequence of intervals continues beyond this.  Argue that there must be some ${\displaystyle I_{k}}$ which intersects I.  Hint: If this were false there would be a positive lower bound on the sequence ${\displaystyle \langle s_{m}\rangle }$.  Call N the least index for which ${\displaystyle I_{N}}$ intersects I.  

4) Argue that ${\displaystyle \ell (I)<2\ell (I_{N})}$ and infer that ${\displaystyle x\in 5*I_{N}}$. 

1. Decompose ${\displaystyle E_{c}}$ into two parts, the part inside ${\displaystyle \bigcup _{k=1}^{n}I_{k}}$ and the part outside. Use subadditivity to infer that

${\displaystyle \lambda (E_{c})<{\frac {1}{c'}}\sum _{k=1}^{n}(f(s_{k})-f(r_{k}))+\varepsilon \leq {\frac {1}{c'}}(f(b)-f(a))+\varepsilon }$

Then let ${\displaystyle \varepsilon \to 0}$ and ${\displaystyle c'\to c}$.

2. Now use the above, together with the continuity of measure, to conclude that the set of points at which the upper-left derivative is infinite.

Then argue that the same is true for the lower-right, upper-left, and upper-right derivatives.

Show that there is an open set ${\displaystyle {\mathcal {O}}}$ such that ${\displaystyle E\subseteq {\mathcal {O}}\subseteq (a,b)}$ with the property that ${\displaystyle \lambda ^{*}(E_{c,d})<\lambda ^{*}({\mathcal {O}})+\varepsilon }$.

Then define a collection of closed intervals that are each inside of ${\displaystyle {\mathcal {O}}}$, in a way analogous to what was done for the infinite derivative case. Argue that this is a cover in the sense of Vitali.

Complete rest of the argument in a way that is strongly parallel to the proof for the case of infinity, until you reach

${\displaystyle \lambda ^{*}(E_{c,d})\leq {\frac {1}{d}}\sum _{k=1}^{n}(f(s_{k})-f(r_{k}))+\varepsilon }$

and then justify and use the fact that ${\displaystyle f(s_{k})-f(r_{k})\leq c\lambda ^{*}(E_{c,d})}$.

The path to the final result should not be very hard (nor very easy!) to find from here. But do your best.