12:55 AM
2

The author of Riemann's Zeta Function, H.M.Edwards, says: According to Euler, $\sum_{p<x}\frac{1}{p}\sim \log(\log(x))$ when $x\longrightarrow\infty$. $\log(\log(x))=\int_{1}^{\log(x)} \frac{du}{u}=\int_{e}^{x} \frac{dv}{v\log(v)}$ so (1) says that the integral of $\frac{1}{v}$ relative to th...

1:07 AM
3

I would like to understand the reason behind this pattern: \begin{align} \sqrt 1 &= 1 \\ \sqrt{0.1} &= 0.31622 \\ \sqrt{0.01} &= 0.1 \\ \sqrt{0.001} &=0.03162 \\ \sqrt{0.0001}&=0.01 \\ \sqrt{0.00001}&=0.003162 \end{align}. I expected $\sqrt{0.1}$ to "behave" in a similar way to $\sqrt 1$... Why...

2 hours later…
2:49 AM
0

I've a separate front and back end. I'd like to be able to use sameSite:'strict' in my FE cookies, and I think using a subdomain fulfils the same site requirements So I was planning to use api.example.com for the backend, and www.example.com for the front, and then use relevant server block to se...

5 hours later…
7:26 AM
2

This post outlines 'fake' complex numbers (real numbers with complex closed form that usually come from the roots of unfactorable cubics (the example I need right now), or they can come from things like $i^i = e^{-\frac{\pi}{2}}$), in his own answer he gives the example: $\sqrt[3]{1+i \sqrt{7}}+\... 8 hours later… 3:08 PM 2 Let$X$be a smooth projective curve over a field$k$and$K_X$be its canonical line bundle. By the Serre duality,$\text{H}^1(X,K_X)$is a one-dimensional$k$-vector space. On the other hand,$\text{H}^1(X,K_X)=\text{Ext}^1(O_X,K_X)\$ so this vector space corresponds to the set of extensions of ...

8 hours later…
10:38 PM
6

#include <tuple> struct X { int i = 0; friend constexpr bool operator<(const X &l, const X &r) noexcept { return l.i < r.i; } }; struct Y { int i = 0; constexpr operator bool() const noexcept { return i != 0; } friend constexpr bool operator<(const Y &...