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...

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...

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...

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}}+\...

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 ...

#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 &...