Recall a prime $p$ is a Wieferich prime if $p^2|2^{p-1}-1$. The only known Wieferich primes are $p=1093$ and $p=3511$. A prime $p$ is a generalized Weiferich prime to base $q$ if $p^2|q^{p-1}-1$. It is strongly suspected that there are infinitely many Weiferich primes to base $q$ for any $q>1$. I...

The typical application of Sylow's Theorem is to count subgroups. This makes it difficult to search the web for other applications, since most hits are in the context of qualifying exams. What are other uses of Sylow's Theorem? In particular, are there famous/common instances where the goal is t...

I'm developing some application that shall monitor some data in real time. The application shall collect data from the network, parse the relevant packets from my protocol and store it to the database. When I start the application - everything seems to be OK, but then lags are starting to appear ...

Upon trying to draw a ZZFeatureMap instance, I only see the name "ZZFeatureMap" and not it's architecture. Please find the code snippet and output attached: from qiskit.circuit.library import ZZFeatureMap zz = ZZFeatureMap(2, entanglement="full", reps=2) zz.draw("mpl") However, print(zz) prints...

Is there a result showing that something along the lines of the three body problem is undecidable? Or are they known to be decidable or neither? I mean problems along the lines of the following formulated in some suitable system: Given masses, velocities and positions in 3 dimensions and a dista...

Let $G$ be a finitely presented group and let $L(G)$ be the Magnus Lie algebra associated to the lower central series of $G$. This $L(G)$ is a graded Lie ring generated by its degree 1 piece $L_1(G) = G^{ab}$. Must $L(G)$ be a finitely presented Lie ring? If it makes it easier, I would be happ...