This post is dedicated to testing out the newly announced Stack Snippets feature. Feel free to answer with your own Stack Snippets, and have some fun!
This could crash your browser. Have a nice day :)
a=[];while(true){a.push(a)};

Didn't realize this would crash the browser until I expanded it. I wish stackoverflow would protext against this. – Eric Oct 2 '15 at 8:43
Let
 $(\Omega,\mathcal A)$ be a measurable space and $\mathbb F=(\mathcal F_n)_{n\in\mathbb N_0}$ be a filtration on $(\Omega,\mathcal A)$
 $E$ be an at most countable set equipped with the discrete topology
 $X=(X_n)_{n\in\mathbb N_0}$ be a discrete Markov chain on $(\Omega,\mathcal A)$ with respect to $\mathbb F$ with values in $(E,\mathcal E)$
Let $x\in E$ be recurrent, $$\tau_x^k:=\inf\left{n>\tau_x^{k1}:X_n=x\right}\;\;\;\text{with }\tau_x^0:=0\;,$$ $t_0:=x$ and $$t_k:=\tau_x^k\tau_x^{k1}\;\;\;$$ for $k\in\mathbb N$. How can we prove, that $(t_k)_{k\in\mathbb N_0}$ is independent and identically distributed?
Let $k\in\mathbb N_0$. Then, $\tau:=\tau_x^{k1}$ is a $\mathbb F$stopping time. Let $$\tilde X:=\left(X_{\tau+n}\right)_{n\in\mathbb N_0}\;.$$ The strong Markov property yields for all $n\in\mathbb N_0$ \begin{equation} \begin{split} \operatorname P_x\left[t_k=n\right]&=\operatorname P_x\left[\tilde X_1\ne x,\ldots,\tilde X_{n1}\ne x\text{ and }\tilde X_n=x\right]\ &=\operatorname P_{X_\tau}\left[X_1\ne x,\ldots,X_{n1}\ne x\text{ and }X_n=x\right]\ &=\operatorname P_x\left[X_1\ne x,\ldots,X_{n1}\ne x\text{ and }X_n=x\right] \end{split}\tag 1 \end{equation} $\operatorname P_x$almost surely, since $\operatorname P_x\left[\tau<\infty\right]=1$ by the recurrence of $x$. Since the righthand side of $(1)$ doesn't depend on $k$, the $t_k$ are indeed identically distributed.
How can we show, that they are independent, too?
Thankyou for the downvotes; I confirmed Fullscreen rendering when the answer is greyed out was wrong. They've now disabled the running of code snippets when the post gets downvoted.
<h1>Just testing...</h1>

Hmm. I'm not sure we should worry too much about fullscreen rendering for a negativepoints question, but the transparent overlay isn't exactly functional. – AmeliaBR Sep 9 '14 at 1:07

@AmeliaBR It's not the rendering per se, but the fact that most of the rest of the display is still interactive while you're in fullscreen mode! I edited this comment while fullscreen was active, for example. – Mark Hurd Sep 9 '14 at 1:19

1Hadn't even thought to try that. But I think you'll have to leave a bug report on the current feedback thread to get something to happen  unless someone is trying out the sandbox themselves,they aren't likely to discover your 13 answer when there are two pages of posts! – AmeliaBR Sep 9 '14 at 3:16

@AmeliaBR Good point, but this was based upon a downvoted feedback post from the original feedback Q. – Mark Hurd Sep 9 '14 at 3:20



5@modiX, you don't lose rep on this meta site, so downvotes don't hurt you. – gunr2171 Sep 10 '14 at 19:12


2@gunr2171 I should mention I did think this was Meta Stack Exchange too. – Mark Hurd Sep 11 '14 at 5:54
whateverNumberOfPointsYouWant * 1
and let's settle in the middle? – Haney♦ Aug 26 '14 at 21:049001
points please ;) – 0b10011 Aug 26 '14 at 21:05