Let $A$ be an Artin algebra, $\text{mod}\,A$ the category of finitely generated $A$-modules and $\text{Ab}$ the category of abelian groups. Is every additive, covariant, left-exact functor $F:\text{mod}\,A \rightarrow \text{Ab}$ (natural) isomorphic to $\text{Hom}(X,-)$ for some $X\in \text{mod}\...
Is there a way to prove that $2$ is the only prime that never divides $2^n-1$ ? Obviously we can ignore all primes that are themselves of this form. Some other examples:
$$5\,|\,2^4-1 \qquad 9\,|\,2^6-1 \qquad 11\,|\,2^{10}-1 \qquad 13\,|\,2^{12}-1 \qquad 17\,|\,2^8-1$$
I checked for all $p<10^6$...
For some reasons, I've always thought that deduction guides must have the same noexcept-ness of the constructor to which they refer. For example:
template<typename T>
struct clazz {
clazz(const T &) noexcept {}
};
clazz(const char &) noexcept -> clazz<int>;
That is, if the constructor is no...
i.e. could we find a subset $X\subset \mathbb{Q}^2$ such that $\overline{X}=\mathbb{R}^2$ and that for any $x,y\in X$ the distance $|x-y|$ is an irrational number?
I'm considering the following assertion of which I'm not sure :
Given finite rational points $p_1,p_2,\dots,p_n$ , and an open ball ...
For some reasons, I've always thought that deduction guides must have the same noexcept-ness of the constructor to which they refer. For example:
template<typename T>
struct clazz {
clazz(const T &) noexcept {}
};
clazz(const char &) noexcept -> clazz<int>;
That is, if the constructor is no...
