They mean all \langle x,-x+\epsilon\rangle such that x\in(a,b) and 0<\epsilon<1/n; that includes both rational and irrational x. You have a particular n and a non-empty open interval (a,b) ...

For any K-module T there is a canonical isomorphism \operatorname{Hom}_K(A\otimes B,T)\simeq\operatorname{Bil}_K(A\times B,T). Thus in order to prove that x\otimes1\neq1\otimes x it is ...

You square first, and then apply the negative, since the negative is outside the parentheses. So, -(x+h)^2 = -(x^2 + 2xh + h^2) = -x^2 - 2xh - x^2. If the negative were inside , it would be ...

Canonical correlation analysis. See Lai & Xing (2008). Statistical Models and Methods for Financial Markets, for example.

A closed subspace of a Lindelöf space is Lindelöf too, so if the Sorgenfrey plane is, so is L. But L in the subspace topology is discrete, as every singleton is open as [a,b) \times [-a, d) \cap L = \{(a,-a)\} ...

are the interpretations of the following terms equal to \top : \mathrm{Hom}(1,\Omega)? Yes, the three principles you state are valid in the internal language of any topos, and the proofs you provide ...