Revision as of 23:13, 21 April 2025 by Bot (Created page with "<div class="d-none"><math> \newcommand{\mathds}{\mathbb}</math></div> {{Alert-warning|This article was automatically generated from a tex file and may contain conversion errors. If permitted, you may login and edit this article to improve the conversion. }}Prove that the number of partial permutations is given by <math display="block"> |\widetilde{S}_N|=\sum_{k=0}^Nk!\binom{N}{k}^2 </math> that is, <math>1,2,7,34,209,\ldots\,</math>, and that we have the estimate <...")
BBot
Apr 22'25
Exercise
[math]
\newcommand{\mathds}{\mathbb}[/math]
This article was automatically generated from a tex file and may contain conversion errors. If permitted, you may login and edit this article to improve the conversion.
Prove that the number of partial permutations is given by
[[math]]
|\widetilde{S}_N|=\sum_{k=0}^Nk!\binom{N}{k}^2
[[/math]]
that is, [math]1,2,7,34,209,\ldots\,[/math], and that we have the estimate
[[math]]
|\widetilde{S}_N|\simeq N!\sqrt{\frac{\exp(4\sqrt{N}-1)}{4\pi\sqrt{N}}}
[[/math]]
in the [math]N\to\infty[/math] limit.