12:40 AM
4

Call an abelian group $G = (G,+)$ $m$-torsion for some natural number $m$ if one has $m \cdot x = 0$ for all $x \in G$. A subgroup $H$ of $G$ is said to be complemented if one can write $G = H \oplus K$ for some other subgroup $K$ of $G$. I was able to establish the following fact: Proposition...

1:40 AM
1

I'd would like to confirm if the following proposition is indeed true in the case of an arbitrary measure space. Theorem: Let $(X,\Sigma,\mu)$ be a measure space and $\{f_n\}_{n\in\mathbb{N}}\subseteq \mathcal{L}^1_\mathbb{R}(\mu )$. If the limit $\lim_{n\to\infty}\int _Ef_nd\mu\in \mathbb{R}$ ...

1 hour later…
2:52 AM
1

Suppose $C_n$ is a product of $n$ $d\times d$ matrices with IID entries coming from standard normal. The following appears to be true. Is there an elementary proof? $$E[\|C_n\|_F^2]=d^{n+1}$$ This follows from discussion on math.SE on the moment method, but unclear how to adapt it to this, since ...

3 hours later…
5:52 AM
5

Given a presentation of some group, what are nice criteria to conclude that the presentation describes a free group? Even stronger is there a subclass of presentations (where one easily checks whether the presentation is in that class), for which it is algorithmically decidable whether a presenta...

5 hours later…
11:08 AM
0

I have a somewhat unique situation. I've provided a bit of sample data. theCols <- data.frame( x = rep(c("Black", "Blue", "Brown", "Green", "Grey", "Orange", "Purple", "Red", "White", "Yellow"), c(90, 40, 16, 23, 1, 71, 32, 43, 28, 5)) ) One might imagine that, because the actual data bein...

5 hours later…
4:26 PM
0

I'm learning android development with "Head First Android Development" by Dawn Griffiths. In this book, it explains that onPause() method is called when another app comes to focus but still visible on the screen. But the code inside onPause method doesn't seem to be executed. I tested this with s...

4:52 PM
2

This question was initially posted on math.stackexchange.com but did not receive any answers for half a week. While analyzing the properties of an algorithm I am working on (I'm a computer scientist), I came up with the following inequality. I am counting the occurrences of two different events u...

2 hours later…
6:22 PM
1

I am looking for a simple and short proof showing that $X \to \|X X^\top\|_F^2$ is a convex function where $\|\cdot\|_F$ is the Frobenius norm. I have one proof by showing that the derivative is monotone but it is quite heavy. I expect that there are simple arguments showing this.

6:35 PM
3

I know there are many questions on the site about finding a proof that π is irrational, but I'm posting the question separately to discuss a particular proof further We know that the Wallis Product is : \frac{π}{2}=(\frac{2}{1}\cdot\frac{2}{3})(\frac{4}{3}\cdot\frac{4}{5})(\frac{6}{5}\cdot\frac...

2 hours later…
8:40 PM
7

Thinking about the four square theorem and related questions, I found myself wondering: What is the minimal density of a set $A \subset \{0, 1, 2, ... \}$ such that $A + A = \mathbb{N}$? What I know: If A has less than quadratic density, then $A + A$ is not $\mathbb{N}$ by a simple counting argu...