I am interested in a morphism of $S$-schemes $f : X \to Y$ such that $X$ and $Y$ are proper over $S$ and there is some $s_0 \in S$ such that $f : X_{s_0} \to Y_{s_0}$ is a closed immersion. Is it true that there is an open neighborhood $U \subset S$ of $s_0$ so that $X_U \to Y_U$ is a closed imme...

Problem Description This is my file 1 2 3 4 5 6 7 8 9 10 I would like to send the cat output of this file through a pipe and receive this % cat file | some_command 1 2 ... 9 10 Attempted solutions Here are some solutions I've tried, with their output % cat temp | (head -n2 && echo '...' && tai...

Consider the following R input: if(TRUE){1}else{0} + if(TRUE){1}else{0} The result is 1, but I was expecting 2. If I enclose each if-else statement in parentheses, (if(TRUE){1}else{0}) + (if(TRUE){1}else{0}) then the result is 2. Can someone explain this behaviour?

In Girard's $\Pi^1_2$-logic, a dilator $D$ is a endofunctor which commutes with pull-back and direct limit on $\mathrm{ON}$, the category whose objects are ordinals and morphisms are strictly increasing functions. For dilator $D_0,D_1$, an embedding from $D_0$ to $D_1$ is a natural transformation...

Calculate the limit, if possible $\lim_{z \to -3i} \frac{z^3-27i}{z+3i}$ My approach was initially to calculate the conjugate and simplify, but after $$ \frac{(z-3i)^2(z^2+3iz+9i^2)}{z^2+9}$$ it can't be simplified further. If I continue going on, I get $$ \frac{0}{0}$$ which seems to be wrong....

The basic question is: Does vanishing of homology with trivial coefficients imply triviality of an infinite-dimensional Lie algebra? My question is motivated by acylic groups in group theory. In particular, there is a an acylic group $\textrm{Aut}_f(\mathbb{R})$ of autohomeomorphisms of $\mathbb{...

This is in the spirit of the What is a Word/Phrase™ series started by JLee with Number version puzzles. If a number conforms to a special rule, I call it a Chess Number™. Use the following examples below to find the rule. Chess Numbers™ Not Chess Numbers™ 314 315 273 372 183 180 29...