1:04 AM
2

I've recently been reading Serge Lang's Math Talks for Undergraduates, specifically a section about the abc conjecture. Lang starts by stating and proving the Mason-Stothers Theorem: Let $f,g \in \mathbf{C}[t]$ be nonconstant and relatively prime. Then $\text{deg}(f+g) \leq n_0[fg(f+g)]-1$, wher...

9 hours later…
10:04 AM
7

According to the C++17 standard, what is the output of this program? #include <iostream> #include <string> #include <future> int main() { std::string x = "x"; std::async(std::launch::async, [&x]() { x = "y"; }); std::async(std::launch::async, [&x]() { x = "z"; }); std::cout <<

3 hours later…
12:46 PM
0

I have this contact information from Whatsapp: [email protected] Obtained from this code void startWhatsAppContactPicker() { Intent intent = new Intent(Intent.ACTION_PICK); intent.setPackage("com.whatsapp"); try { startActivityForResult(intent, REQUEST_CODE_PICK_WHA...

1:34 PM
6

Let $G$ be a subgroup of the permutation group $S_n$, and let $H$ be a normal subgroup of $G$ such that the quotient group $G/H$ is abelian. What is the best known upper estimate for the cardinality $|G/H|$? If $p_1, p_2, \ldots, p_m$ are the first $m$ prime numbers and $n=p_1+\cdots+p_m$, let $... 4 hours later… 5:16 PM 2 Let$k/\mathbb{Q}$be a number field and$\mathbb{A}$its ring of adÃ¨les. As usual$\mathbb{A} = \mathbb{A_f} \times \mathbb{A_{\infty}}$. The standard definition of an automorphic representation$(\pi,V)$for$\textrm{GL}_n(\mathbb{A})\$ is its realization as (irreducible) subquotient of the spac...

5 hours later…
9:58 PM
11

The functions from P0553R4: Bit operations are constrained to only work on unsigned integers. The proposal does not give a reason for this constraint. I can see that this makes sense if the bit representation of a signed integer is not defined, but with C++20, we are guaranteed that signed intege...