3:49 AM
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The Rademacher functions are an explicit iid sequence with Bernoulli law. Does it exist an explicit construction of an iid sequence with uniform law?

4:37 AM
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Consider the group $\mathrm{Diff}(\mathbb R^n)$ of smooth diffeomorphisms. It has two interesting subgroups: the orthogonal group $O(n)$, the group of "diffeomorphisms applied along each axis" $\mathrm{Diff}(\mathbb R)^n$, so that $f(x_1, \dotsc, x_n) = \big(f_1(x_1), \dotsc, f_n(x_n)\big)$, whe...

5 hours later…
9:41 AM
Nobody here?

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Looking for an analytic solution to the integral below: $$\int_{-\infty}^\infty \Phi\left(\frac{x - a}{\tau}\right) \phi\left(\frac{x - b}{\sigma}\right)dx$$ where $\Phi(\cdot)$ and $\phi(\cdot)$ are, respectively, the standard normal CDF and PDF.

3 hours later…
1:11 PM
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I downloaded cacert.pem and saved it under PHP extras/ssl folder. In phpinfo() I can see that the cert is pointed at, by curl.cainfo. I test with the following script: <?Php $curl = curl_init() or die("init failed"); curl_setopt($curl, CURLOPT_URL, "https://www.somewhere.on.the.net/license.txt") ...

1 hour later…
2:39 PM
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We are told that after children of Israel had sinned God sent serpents to bit them to death NUMBERS 21:6 NASB Then the Lord sent fiery serpents among the people and they bit the people, so that many people of Israel died. Later after repentance it seems the serpents continued to bite the Israel...

5 hours later…
7:55 PM
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In [KM63], Kervaire and Milnor introduced the group of homotopy spheres. Its elements are h-cobordism classes of smooth homotopy $n$-spheres under the summation induced by connected sum. Further, the trivial element is $S^n$ and this group is denoted by $\Theta^n$. They proved that $\Theta^n$ is ...

8:51 PM
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Question Let $\mathbb{N} = \{0, 1, 2, \dots \}$, $\mathbb{N}^+ = \mathbb{N} - \{0\}$, $m \in \mathbb{N}^+$ and define the function $f$ as below $$f(i) = (a + i \, b) \bmod m,$$ where $a, \, b \in \mathbb{N}$. I want to show that $\big( f(0), f(1), \dots, f(m-1) \big)$ is a permutation of $(0, 1, ... 9:21 PM 5 I was recently compiling some notes for an undergrad-level course on number theory, and I went over the proof of the fact that$(\mathbb{Z}/p\mathbb{Z})^\times$is cyclic for any prime$p$: it's a finite abelian group and thus the direct sum of cyclic groups, and the fact that$X^r - 1\in (\mathb...

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Let $A$ be an $n\times n$ matrix, $B$ be an $n\times m$ matrix, $C$ an $m \times m$ matrix, and consider the sum $$\sum_{k = 0}^{N-1} A^k B C^k.$$ Is there any smart way to rewrite this sum in a way similar to the partial sums of the geometric series; namely for $a,b \in \mathbb{R},$ \sum_{k = ...