Can we find the following $k$ so that the following inequality holds for asymptotic normal?

Question

Following this question:Can we find such $k$ so that the following inequality holds?.

Consider a sequence of independent $n-$dimensional random vectors $u, v_1, v_2,\dots, v_k$ uniformly distributed on the unit sphere on $\mathbb{R}^n$. Define $X_i=\sqrt{n}(u\cdot v_i)$ for $i=1,\dots, k$. Note that by central limit theorem, we have $X_i\to N(0,1)$ as $n\to \infty$ for $i=1,\dots, k$. Can we still prove this similarly inequality?

Fix $\epsilon\in (0,1)$, can prove that for any $\delta>0$ there exists $1\le k=k(\epsilon, \delta)$ (some number) so that $$ \lim_{n\to \infty}\mathbb{P}\left(\frac{X_1^2+X_2^2+\dots+X_k^2}{X_1^2}>\frac{1}{\epsilon^2}\right)>1- \delta ? $$

Answer 1

$\newcommand\ep\epsilon\newcommand{\R}{\mathbb R}$By the spherical symmetry, conditionally on $u$, the $X_i$'s are iid random variables (r.v.'s) each with a conditional distribution not depending on $u$. So, even unconditionally, the $X_i$'s are iid r.v.'s each equal $X:=\sqrt n\,e_1\cdot v$ in distribution, where $v:=v_1$ and $e_1$ is the first vector in the standard basis of $\R^n$.

Next, the random vector $v$ equals $\frac{(G_1,\dots,G_n)}{\sqrt{G_1^2+\dots+G_n^2}}$ in distribution, where $(G_1,\dots,G_n)$ is a standard Gaussian random vector in $\R^n$. So, $X^2$ equals $\frac{G_1^2}{(G_1^2+\dots+G_n^2)/n}$ in distribution. So, by the law of large numbers, $X^2$ converges to $G^2$ in distribution as $n\to\infty$, where $G:=G_1$.

Because the $X_i$'s are independent copies of $X$, it follows that \begin{equation} \frac{X_1^2+\dots+X_k^2}{X_1^2}\to\frac{G_1^2+\dots+G_k^2}{G_1^2} \end{equation} in distribution as $n\to\infty$.

So, by the previous answer, \begin{equation} L:=\lim_{n\to\infty}P\Big(\frac{X_1^2+\dots+X_k^2}{X_1^2}<C\Big) \\ =P\Big(\frac{G_1^2+\dots+G_k^2}{G_1^2}<C\Big) \le 2\exp-\frac{k-1}{2(1+\sqrt C)^2}, \end{equation} where $C:=1/\ep^2>1$.

Similarly one can get a better upper bound on $L$ by using the other previous answer.