This c++ code cannot compile: #include <iostream> int main() { constexpr int kInt = 123; struct LocalClass { void func(){ const int b = std::max(kInt, 12); // ^~~~ // error: use of local variable with automatic storage fr...

Simple case. Take $X_{\bullet}$ a cosimplicial space. Is it true that the chain complex of its homotopy totalization is quasi-isomorphic to the homotopy totalization of its chain complex? Because of the computations listed in "homotopy totalization" at nlab, this boils down to a quasi-isomorphism...

Here i am attaching my problem. I want my repository to be hairbodyskin-production. But it is not changing I tried this ` git config remote.origin.url https://x-token-auth:ATCTT3xFfGN02teIasCShaVu_OFcBiXmEGz5eXTLrjSOrRtyaZt-OU3r0II2rUS58_5auPxITl-L7aEVEge-aCHSUOZI4Cl0fgEtHSAzgX9Gg75Zrn2_pC1s7966...

Let $f_1(x)\in \mathbb{Z}[x]$ be a fixed irreducible degree 4 polynomial such that its splitting field $F_1$ is an $S_4$-Galois extension over $\mathbb{Q}$ and the discriminant of $F_1$ is of the form $-k^2$ for some integer $k$. It is possible to show that $F_1$ contains $\mathbb{Q}(\sqrt{-1})$....

Consider the polynomial $$ 27x^4 - 256 y^3 = k^2, $$ where $k$ is an integer. As $k$ varies over all positive integers, is it possible to show that there are infinitely many distinct integral solutions $(X,Y,k)$? There exists at least one solution: $x=12, y=-9, k=864$. NOTE: If $(X,Y,k)$ is a sol...

Prove that for all $k \in \mathbb{N}$ then there exists $n$ such that $$ 7^k \mid 2^n + 5^n + 3 $$ My idea is to construct $n$ such that the equation above is valid. However, the construction that I got is $$n = 3 \cdot 7^{k - 1} + 1$$ which is very weird and almost impossible to find without ...

Dirichlet’s Theorem on Arithmetic Progressions says that if $a, m$ are natural numbers such that $gcd (a,m) = 1$, then there are infinitely many prime numbers in the arithmetic progression $a + km, k \in \mathbb{N}$. I would like to know what is the idea of the proof, and the sketch of the proof,...