I'm not a mathematician but I am a software engineering student. From what I've understood so far, the Cantor diagonal argument proves that the real numbers are infinite and uncountable. My biggest confusion arose from that I thought: "Why aren't the natural numbers uncountable? They continue for...

Consider a smooth manifold $M$, a diffeomorphism $\varphi\in\mathrm{Diff}^\infty(M)$, and an open subset $B\subseteq M$. Suppose that, when restricted to $B$, $\varphi^n$ converges uniformly to a constant map with image $x\in M$. For $\xi\in T_yM$ over some $y\in B$, do the tangent vectors $D_y\...

Let $a,b$ be positive integers, $F=\mathbb{Q}(a^{1/3},b^{1/2})$. Let $E$ be the elliptic curve defined over $F$ by the cubic equation $$y^2=x^3+3a^{1/3}x+2b^{1/2}.$$ Then the $j$-invariant $j(E) = \frac{1728a}{a+b} \in \mathbb{Q}$. Hence $E$ has a model defined over $\mathbb{Q}$ up to an isomorph...

Let $R$ be a commutative Noetherian ring and $D^b(R)$ be the bounded derived category of finitely generated $R$-modules. Let $D_{sg}(R)$ be the singularity category, which is the Verdier localization $D^b(R)/\text{thick}_{D^b(R)}(R)$. If $r\in R$ and $M\in D^b(R)$ are such that the morphism $M\xr...

Let $f$ be a CM modular forms with coefficients in the imaginary qudaratic field $K=Q(\sqrt{-3}))$ which correspond to an elliptic curve $E$ defined over $K$. Then Shimura constructed an abelian variety $A_f$ of dimension $2$ which is the quotient of the Jacobian $J_1(N)$ in the paper On the fact...

From Ritchie's Fabulae Faciles: Tris dies per totam insulam matrem quaerebat; tandem quarto die ad templum Dianae pervenit. http://www.thelatinlibrary.com/ritchie.html What does "Tris dies" mean? Is it a typo? Should it be "tres dies" (three days)?

Let $M$ be a closed manifold, and let $\mathscr{M}$ be the space of all Riemannian metrics over $M$. It is known that this is a Fréchet manifold. Consider also $\mathscr{D}$ the diffeomorphisms group of $M$. It acts upon $\mathscr{M}$ by pullback. It is well known Ebin70 that the set of Riemannia...

Let $\mathbb H$ be a Hilbert space and let $\mathcal B(\mathbb H)$ be the bounded operators on $\mathbb H$. Let $J,K\in \mathcal B(\mathbb H)$ such that $ J=J^*, K=-K^*. $ Then the commutator $[J,K]$ is selfadjoint, equal to $JK+(JK)^*$. Claim. If $[J,K]\ge 0$, then $[J,K]=0$. Question. Is it tr...

The Osgood's lemma in complex analysis says that if $f \colon \mathbb{C}^n \to \mathbb{C}$ a continuous function such that $f|_{L}$ is holomorphic for every complex line $L \subset \mathbb{C}^n$, then $f$ is holomorphic. I wonder if there is the following geometric analogue of Osgood's lemma: Le...