Revision a3b97436-fcd5-4f0c-9a9f-9b106bce4661

Let $n$ be postive integer number, and $x_{i}\ge 0$, such 
$$x_{i}x_{j}\le 4^{-|i-j|},1\le i,j\le n$$
then I have prove 
$$x_{1}+x_{2}+\cdots+x_{n}<\dfrac{5}{3}$$



**Question :**

Let $n$ be postive integer number, and $x_{i}\ge 0$, such 
$$x_{i}x_{j}x_{k}\le 4^{-|i-j-k|},1\le i,j,k\le n$$
then I have prove 
$$x_{1}+x_{2}+\cdots+x_{n}<C$$
find the best constant  $C?$