8:56 AM
0

Prior to April, I was able to run this PS1 script to install Adobe acrobat and zoom. The script was able to check the version on the site (s) and download and install... However, from April to here I have to specify the version (current) in order to download and install... Can anyone help me to h...

5 hours later…
1:46 PM
3

I'm working on a question from a past exam paper, Show that the set of solutions $G_{d,p}$ to Pell's equation $x^2-dy^2=1$ modulo $p$ is a finite abelian group, and compute the order of this group for $p=5$ and all $d$. Just proving associativity took 6 page-width lines of fairly meticulous wor...

2:27 PM
7

For nice topological spaces (say Haudorff spaces) $X$ and $Y$, there is a bijection between continuous maps $X\to Y$ and isomorphism classes of geometric morphisms $\mathrm{Sh}(X)\to \mathrm{Sh}(Y)$. Question: Is there a similar statement for "nice" schemes, i.e., that morphisms of schemes $X\to ... 2 hours later… 3:57 PM 1 Let$E$be a nowhere dense subset of$\mathbb{R}\times \mathbb{R}$. For$x\in \mathbb{R}$, define $$E_x=\{ y\in\mathbb{R}\mid (x,y)\in E\}.$$ Let$D$denote the set of$x$for which$E_x$is NOT nowhere dense in$\mathbb{R}$. By the Kuratowski-Ulam Theorem, we know that$D$is of first cateogory ... 6 hours later… 10:27 PM 4 Let$k$be a nonarchimedean local field and$G$a reductive$k$-group, which we assume to be semisimple and simply-connected. Recall that an abstract group$H$is perfect if it is generated by commutators, that is, equals its derived subgroup. Question: Is$G(k)$perfect? When$G$is isotropic,$...

10:40 PM
1

I want to write a number 1234 in the form 1 234. I tried \documentclass[12pt,a4paper]{article} \usepackage{amsmath} \begin{document} The number $1234$ is written in the form $1\,234$; The number $123456789$ is written in the form $123\,456\,789$. \end{document} How can I make it automati...