It seems that there is no digital copy of Leon Karp's Ph.D. thesis L. Karp, Vector fields on manifolds, Thesis, New York Univ., 1976. on internet and his paper excerpted from his thesis is very brief and without any detailed proof. (I wonder that peers read the thesis or they trust to the advisor...

Let us consider a smooth projective curve $\Sigma_b$ of genus $b$, and assume that there is a surjective group homomorphism $$\varphi \colon \pi_1 (\Sigma_b \times \Sigma_b - \Delta) \to G,$$ where $\Delta \subset \Sigma_b \times \Sigma_b $ is the diagonal and $G$ is a finite group. Assume moreov...

Suppose $E$ is an elliptic curve over $\mathbb Q$ and $x \in E(\mathbb Q)$ is not torsion. We can reduce $x \pmod p$ for a prime $p$ of good reduction and it will have some order $n_p$ in the group $E(\mathbb F_p)$. Has there been any work on the asympotitcs of the average of $n_p$ for $p < X$ as...

std::bit_width finds minimum bits required to represent an integral number x as 1+floor(log(x)) Why does std::bit_width return 0 for the value 0, shouldn't it return 1. Since the number of bits required to represent 0 is 1. Also, I think the 1 in the formula is an offset

This is a simplified example of something I've encountered: trait Bla<'a> { fn create(a: &'a Foo) -> Self; fn consume(self) -> u8; } struct Foo; impl Foo { fn take(&mut self, u: u8) {} } struct Bar { foo: Foo, } impl Bar { fn foobar<'a, 'b, B: Bla<'b>>(&'a mut self) whe...

Let $M$ be a connected closed oriented manifold with at least one orientation-reversing homeomorphism $M\to M$. Let $S\subset M$ be a connected closed embedded submanifold of lower dimension. Let $f:M\to M$ be an orientation-preserving homeomorphism. Is there an orientation-reversing homeomorphis...

"A refinement of the Peter–Weyl theorem" is the title of Chapter 29 in Lusztig's "Introduction to quantum groups" (Birkhäuser 2010, reprint of the 1994 edition). This chapter is inside Part IV ("Canonical basis of $\dot{\mathbf U}$", chapters 23–30). If I understand correctly, the said refinement...

Zorn’s Lemma applies to posets in which every chain has an upper bound. However, in all applications I know, the poset is also evidently chain-complete — chains have least upper bounds. A few classic such applications: AC, using a poset of “partial choice functions” the Well-Ordering Principle...

Apologies in advance if this is well-known; a google search did not produce anything useful. Let $(M,p)$ be a pointed real analytic manifold. Are the (free or pointed) loop spaces of continuous, smooth and analytic loops in $M$ all homotopy equivalent?