Let $X \in R^n$ be a random vector such that
$$P(|X_i| > \epsilon) > e^{-\epsilon^2}$$
What is a tight bound on
$$P(\sum_{i=1}^n |X_i| > \epsilon)$$
and on
$$P(\max_{1\le i\le n} |X_i| > \epsilon)?$$
The $X_i$ can be arbitrarily dependent. The best I can get for both bounds is $n e^{-\epsilon^2}$ (using the union bound).