I have a set of dependent Bernoulli variables $X_i$ for $i \le N$, with probability $\epsilon$ for the event $X_i=1$.
I want to bound the probability that $\sup_i X_i \ge 1$, i.e., I want to know what is the probability that all of them are 0.
I can't use Bernstein's inequality (with $\sum_i X_i \ge 1$ which is equivalent to $\sup_i X_i \ge 1$) because the variables are dependent.
In fact, I can't use Bernstein's inequality because it contains a term of the form $N \epsilon$, and I do not have $\epsilon = o(N)$, which means that the probability is going to be very large.
However, my variables are very much dependent. So, another way to approach it is to use bound the probability $P(X_1 = 1 \cup X_2 = 1 \ldots \cup X_N = 1)$. A simple union bound won't help again because $\epsilon$ is not $o(N)$. However, I was hoping there are some standard ways to define dependence, or make assumptions about dependence, such that this probability is small. I am willing to make some reasonable assumptions here about the dependence.
