Let $X$ be a Banach space and let $P$ be a bounded, linear projection on $X$. Is $P[B_X]$ closed in $X$? Here $B_X$ is the closed unit ball of $X$. This is trivial if $X$ is reflexive, but otherwise is it true?

Inspired by my (currently deleted) answer to this question (but there's a summary in my comment thereto), I was wondering whether the constructor for the Derived class in the code below exhibits undefined behaviour. #include <iostream> class Base { public: Base(int test) { std::cout <<

I do not know where this question is on the trivial to intractable spectrum. Consider the set of isomorphism classes of groups finitely generated by elements of finite order. What is the cardinality of this set? The motivation here is that the dual of every such group gives a quantum permutation ...

I recently developed a fully-functioning random forest regression SW with scikit-learn RandomForestRegressor model and now I'm interested in comparing its performance with other libraries. So I found a scikit-learn API for XGBoost random forest regression and I made a little SW test with an X fea...

Let $F$ be a totally real number field of degree $n$. Let $K/F$ be a finite abelian extension with $G:=\textrm{Gal}(K/F)$. Let $\tau_i$ denote the complex conjugation corresponding to any complex place of $K$ above a place $\sigma_i$ of $F$. Let $G'$ denote the subgroup of $G$ generated by $\frac...

Probably an easy question, but here goes: In a concrete von Neumann algebra $M \subseteq B(H)$, every element $m \in M$ has a polar decomposition $m= p|m|$ where $p$ is a partial isometry and $|m|= \sqrt{m^*m}$. Imposing extra conditions on $p$ ensures that $p$ is unique. For example, one can ask...

Let $A$ be an $R$-algebra. Suppose $A$ has a $R$-coalgebra structure compatible with the algebra structure. (I.e. there is a comultiplication map $\Delta$ and counit map $\epsilon$ compatible with the multiplication map and unit map of $A$.) Then I am wondering whether $A$ can have another $R$-co...