Consider the highest power of 5 in the product $1^1. 2^2 . 3^3 .....n^n$ is given by $H(n)$ (i.e., $H(n)$ denotes the largest integer $k$ such that $5^k$ is an integral dvisior of the above product. Then the value of $\lim_{n \to \infty} \frac {n^2}{H(n)}$.
My try:
I tried writing the product se...
I have my own totally ordered hierarchy of quantities, including infinite ones. Can I embeed them in surreal numbers somehow?
For instance, I have the quantity $\omega$, which I identify with the similarly-denoted surreal number.
I also have a quantity $\alpha$, which is greater than any transser...
I have the following letter sequence: "MGGGRYSGTK"
I wish to keep all the Gs in the same spot, but shuffle the remaining letters. The code I have so far is as follows. I need help on how to insert the G's back into their original place.
sequence <- "MGGGRYSGTK"
# Find the positions of Gs in the ...
Let $f: [0, 1] \to \mathbb R$ be a continuous function. Define the local Hölder exponent $H(f, x)$ of $f$ at $x \in [0, 1]$ by
$$H(f, x) := \sup\left\{0 \leq \alpha \leq 1\mid\lim_{\delta \to 0_+} \sup_{y, z \in B_\delta (x)} \frac{|f(y) - f(z)|}{|y-z|^\alpha}\ \, \text{is finite}\right\}.$$
Let ...
To prove that functions $f_1(x), \dots, f_n(x)$ with $x \in \mathbb R$ are linearly independent, we only need to show that the Wronskian of these functions is non-zero at a certain value of $x$. Now suppose that $f_1(x), \dots, f_n(x)$ are formal power series. Is there a systematic way to show th...
We consider Artin-Tits groups of two generators $(I_2(n))$. Are these groups ordered groups?
