A topological space $X$ is concentrated on a set $D$ iff for any open set $G$ if $D\subseteq G$, then $X\setminus G$ is countable. What is an example of a separable metrizable (uncountable) meager (meaning a countable union of nowhere dense subsets, also known as a set of first category) space $X...

PROBLEM For a list of numbers, list: Find the lowest possible integer, x, which is optimally close to the whole number even-harmonics of the values in list. list has a length of n, and all of the values in list are <= 2000 x has a precision of 1.0 (integers only), and must be a value in the rang...

I want to get a single equation number for this multiple equation with \label I need for cross referencing. Also, I need a tall curly brace prior to the equation number.

If $\boldsymbol{A}\in\mathbb{R}^{n\times n}$ is the cost-matrix of an assignment problem, then the usual statement of the problem of finding an optimal assignment is to identify $n$ elements $a_{i,\,\pi(i)},\ i=1\cdots n$ of least cost-sum, i.e. to directly determine the solution set from $\bolds...

A triangulation of a convex polytope $P\subset\Bbb R^n$ is a partition of $P$ into $n$-simplices $\{\Delta_1,...,\Delta_m\}$ each of which has all its vertices among the vertices of $P$. A polytope may have many different triangulations. Question I: do all combinatorially equivalent polytopes ha...

Has there ever been a set theory without an empty set? Is this possible? I ask because we usually take the empty set to exist axiomatically or obtain it through separation and a nonempty set together with the standard parameter-free predicate $X\neq X$, but it seems possible to have a 'set theo...