Let $X$ be a genus $g$ smooth projective curve, defined over $\mathbb{Q}$, and let $\overline{X}$ denote the base change of $X$ to $\overline{\mathbb{Q}}$. It is well known that $H^1_{\text{ét}}(\overline{X}, \mathbb{Q}_p)$ has the structure of a $p$-adic Galois representation. When $g=1$, I reca...

A positive integer is said to be an Ecuadorian number if for some m, the sum of the first m of its n digits, m < n, is equal to the sum of all its other digits. Numbers such as 11, 134, 235, 2024 are all Ecuadorian. What is the largest gap there can be between two consecutive Ecuadorian numbers?

Task Output the sequence that precisely consists of the following integers in increasing order: the 2nd and higher powers of 10 (\$10^i\$ where \$i \ge 2\$), the squares of powers of 10 times 2 or 3 (\$(2\times 10^i)^2\$ and \$(3\times 10^i)^2\$ where \$i \ge 1\$), and the cubes of powers of 10 ...

I am trying to confirm the initial publication of Lagrange's Four Squares Theorem. Most of my sources give that it was proved by him in $1770$. However, the generally very good Penguin Dictionary of Mathematics (4th ed.) edited by David Nelson, has this date as $1772$. I am pretty sure that this ...

In the article "Ensembles exceptionnels" by A. Beurling, the author cites the following theorem of Fejér: Suppose that a $2\pi$ periodic function $ f $, Lebesgue integrable in $(0,2\pi)$ satisfies the property that $$ \sum_{n=0}^\infty n |\hat{f}(n)|^2 < + \infty, $$ then there exists a sequence ...

According to Adams' paper "Summary on complex cobordism", a manifold is stably almost-complex if it can be embedded in a sphere of sufficiently high dimension with a normal bundle which is a $U(n)$-bundle. He then says "It is also possible to say this in terms of the tangent bundle of $M$, but th...

Let $X$ and $Y$ be two random variables drawn from two distinct normal distributions, $\mathcal{N} (\mu_X, \sigma_X^2)$ and $\mathcal{N} (\mu_Y, \sigma_Y^2)$, that correspond to the measurements of an experiment at time $t$, with $\sigma$ as the uncertainties of the measurement, $\approx 0.01\mu$...