Let $A=\begin{pmatrix} 1& 1 \\ a^2 &1 \end{pmatrix} \text{ with } a\in (0,\frac{1}{2}]$. Show $$cond_2(A)=||A||_2 \cdot ||A^{-1}||_2\leq 4(1-a^2)^{-1}$$ by first showing $||A||^2_2\leq||A||_1||A||_{\infty}$.
$||A||^2_2$ is the maximal eigenvalue of $A^TA$ and $||A||_1||A||_{\infty}=2\cdot2 = 4$...
This is a cross-post of a question in MSE.
I am reading Lurie's Higher Topos Theory and I need some help to understand a part of the proof of Proposition A.2.6.15. (A.2.6.13 in the published version) This proposition is used repeatedly in the book to construct various model structures.
In the p...
I am using Java to automate a process on a wepage with selenium. I have the following line of code to get a text inside a font tage:
var elem = driver.findElement(By.xpath("/html/body/uni-app/uni-page/uni-page-wrapper/uni-page-body/uni-view/uni-view[3]/uni-view[1]/uni-view[2]/font/font")).getText...
This is a cross-post of a question in MSE.
I am reading Lurie's Higher Topos Theory and I need some help to understand a part of the proof of Proposition A.2.6.15. (A.2.6.13 in the published version) This proposition is used repeatedly in the book to construct various model structures.
In the p...
