Let $\pi: M\to B$ be a fiber bundle of smooth manifolds with $B$ connected and each fiber of $\pi$ is a compact manifold. Let $G$ be a compact Lie group acting smoothly on $M$ such that $\pi(g\cdot m)=\pi(m)$. It is clear that $G$ acts smoothly on each fiber $M_b$ for $b\in B$. Noe fix a $g\in G$...

Consider the following code : from plotly import graph_objs as go import pandas as pd mtds = ['2022-03', '2022-04', '2022-05', '2022-06'] values = [28, 24, 20, 18] data1 = [] for j in range(4): data1.append([mtds[j], values[j]]) df1 = pd.DataFrame(data1, columns=['month', 'counts']) fig = go...

There is a function \begin{align*} f(x)=x^3 + x^2 +11x +2 \\ \end{align*} Find all prime \begin{align*} x\\ \end{align*} such that a function is also a prime number. I found that this is satisfied with an x value of 3 then the function is equal to 71, so both are primes, but I am unsure how to fi...

The minimal model program attempts to classify algebraic varieties up to birational equivalence. For compact Riemann surfaces, Riemann's uniformization theorem tells us that the geometry of the curve is determined primarily by its genus. In particular, if $M$ is a compact Riemann surface of genus...

In other words, for any two natural numbers, there exist no more than one natural number that equals the sum of the two numbers. Or rather, for any two natural numbers, their sum is unique. In first order logic, I am trying to prove the following: $\forall a,b,c,c'\in \mathbb{N}(a+b=c \land a+b=c...

In classical mathematics, there exists only one Cauchy complete Archimedean ordered field, the Dedekind complete Archimedean ordered field. However, in constructive mathematics, there are multiple Cauchy complete Archimedean ordered fields, which are not provable to be equivalent to each other: o...

In the following code, it seems that the compiler sometimes prefer to call the templated constructor and fails to compile when a copy constructor should be just fine. The behavior seems to change depending on whether the value is captured as [v] or [v = v], I thought those should be exactly the s...

I am currently reading Erdös's paper "The difference of consecutive primes" published in 1940, in which he shows that there exists $\delta>0$ such that $$ A=\liminf_{n\to\infty}{p_{n+1}-p_n\over\log p_n}\le1-\delta $$ His method is essentially a proof by contradiction: Let $I=[(1-\delta)\log n,(1...

In Locally Presentable and Accessible Categories, page 12 (10), A topological space is finitely presentable in $\mathbf{Top}$, the category of topological spaces and continuous functions, iff it is finite and discrete. But the explanation after this sentence makes little sense to me. In particu...

I have a nested list. Each level of this list is named (as in provided dummy example). I want to extract the names (unique) from the 2nd level of my initial list, so I will be able to use them in some further operations. I know how to do it in two steps, but I wonder whether there is more efficie...

Let us say I have a program called foo. It takes 1 argument (e.g. foo 42) and it spits out a single line containing a numerical value (e.g. 2034). I want to find the optimal value for the input argument, so the output is minimized. Currently I do that by hand by (semi-)binary search, but that is ...

Question: If $X$ is a simplicial complex that's simply connected and $2$-dimensional, does there always exist a contractible subcomplex $Y$ satisfying $X^{(1)} \subseteq Y$? The statement is true "down a dimension": If $X$ is connected and $1$-dimensional, then there exists a contractible subcomp...