This is Samuelson's inequality and it needs the \leq sign. If you take the Wikipedia version and rework it for the n-1 definition of S, you will find that it becomes {{ \left| X_i-\bar X \right| } \over S} \leq {{n-1} \over \sqrt{n}}

Hint: Show that \frac{(3k+1)(2k+2)^2}{(2k+1)^2}>3k+4 via polynomial division.

We know \lim\limits_{n\to \infty}{{\sum_{i=1}^nX_i\over n}-\mu\over \sigma/\sqrt{n}}\sim N(0,1)\implies \lim\limits_{n\to \infty}{\sum X_i-n\over \sqrt{n\over 3}}\sim N(0,1)\implies \lim\limits_{n\to\infty}P(n-\sqrt{n}<X_1+\cdots+X_n<n+\sqrt{n})=\Phi(\sqrt{3})-\Phi(-\sqrt3)=2\Phi(\sqrt{3})-1

This is something I actually know something about. I think I’m going to make things hard for you and insist on the use of the additive valuation v_p instead of the multiplicative absolute value \vert\star\vert_p ...

I take it that you assume that \sigma is adapted to the canonical filtration of the Brownian motion; otherwise the reasoning presented in this answer does not work. Since we know that \frac{1}{n} \sum_{i=1}^n \sigma \left( \frac{i-1}{n} \right) = \sum_{i=1}^n \sigma \left( \frac{i-1}{n} \right) \left( \frac{i}{n}- \frac{i-1}{n} \right) \to \int_0^1 \sigma(s) \, ds ...

Let confirm me if these equations are the correct representation of the constraints for the problem?. If you do we can move further into the closed solution. In algebraic notation: \mathbf{P}_0: \sum_{i=1}^n x_i^2-x_i=c\\ \mathbf{P}_t,t:1...n-1: \sum_{i=1}^n x_ix_{i+j}=c\\ ...